| author | huffman |
| Sun, 29 Nov 2009 22:27:47 -0800 | |
| changeset 34103 | 9095ba4d2cd4 |
| parent 33759 | b369324fc244 |
| child 34289 | c9c14c72d035 |
| permissions | -rw-r--r-- |
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(* Title: HOL/Library/Convex_Euclidean_Space.thy |
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Author: John Harrison |
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Translation from HOL light: Robert Himmelmann, TU Muenchen *) |
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header {* Multivariate calculus in Euclidean space. *}
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theory Derivative |
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imports Brouwer_Fixpoint RealVector |
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begin |
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(* Because I do not want to type this all the time *) |
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lemmas linear_linear = linear_conv_bounded_linear[THEN sym] |
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subsection {* Derivatives *}
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text {* The definition is slightly tricky since we make it work over
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nets of a particular form. This lets us prove theorems generally and use |
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"at a" or "at a within s" for restriction to a set (1-sided on R etc.) *} |
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definition has_derivative :: "('a::real_normed_vector \<Rightarrow> 'b::real_normed_vector) \<Rightarrow> ('a \<Rightarrow> 'b) \<Rightarrow> ('a net \<Rightarrow> bool)"
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(infixl "(has'_derivative)" 12) where |
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"(f has_derivative f') net \<equiv> bounded_linear f' \<and> ((\<lambda>y. (1 / (norm (y - netlimit net))) *\<^sub>R |
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(f y - (f (netlimit net) + f'(y - netlimit net)))) ---> 0) net" |
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lemma derivative_linear[dest]:"(f has_derivative f') net \<Longrightarrow> bounded_linear f'" |
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unfolding has_derivative_def by auto |
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lemma FDERIV_conv_has_derivative:"FDERIV f (x::'a::{real_normed_vector,perfect_space}) :> f' = (f has_derivative f') (at x)" (is "?l = ?r") proof
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assume ?l note as = this[unfolded fderiv_def] |
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show ?r unfolding has_derivative_def Lim_at apply-apply(rule,rule as[THEN conjunct1]) proof(rule,rule) |
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fix e::real assume "e>0" |
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guess d using as[THEN conjunct2,unfolded LIM_def,rule_format,OF`e>0`] .. |
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thus "\<exists>d>0. \<forall>xa. 0 < dist xa x \<and> dist xa x < d \<longrightarrow> |
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dist ((1 / norm (xa - netlimit (at x))) *\<^sub>R (f xa - (f (netlimit (at x)) + f' (xa - netlimit (at x))))) (0) < e" |
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apply(rule_tac x=d in exI) apply(erule conjE,rule,assumption) apply rule apply(erule_tac x="xa - x" in allE) |
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unfolding vector_dist_norm netlimit_at[of x] by(auto simp add:group_simps) qed next |
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assume ?r note as = this[unfolded has_derivative_def] |
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show ?l unfolding fderiv_def LIM_def apply-apply(rule,rule as[THEN conjunct1]) proof(rule,rule) |
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fix e::real assume "e>0" |
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guess d using as[THEN conjunct2,unfolded Lim_at,rule_format,OF`e>0`] .. |
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thus "\<exists>s>0. \<forall>xa. xa \<noteq> 0 \<and> dist xa 0 < s \<longrightarrow> dist (norm (f (x + xa) - f x - f' xa) / norm xa) 0 < e" apply- |
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apply(rule_tac x=d in exI) apply(erule conjE,rule,assumption) apply rule apply(erule_tac x="xa + x" in allE) |
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unfolding vector_dist_norm netlimit_at[of x] by(auto simp add:group_simps) qed qed |
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subsection {* These are the only cases we'll care about, probably. *}
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lemma has_derivative_within: "(f has_derivative f') (at x within s) \<longleftrightarrow> |
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bounded_linear f' \<and> ((\<lambda>y. (1 / norm(y - x)) *\<^sub>R (f y - (f x + f' (y - x)))) ---> 0) (at x within s)" |
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unfolding has_derivative_def and Lim by(auto simp add:netlimit_within) |
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lemma has_derivative_at: "(f has_derivative f') (at x) \<longleftrightarrow> |
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bounded_linear f' \<and> ((\<lambda>y. (1 / (norm(y - x))) *\<^sub>R (f y - (f x + f' (y - x)))) ---> 0) (at x)" |
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apply(subst within_UNIV[THEN sym]) unfolding has_derivative_within unfolding within_UNIV by auto |
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subsection {* More explicit epsilon-delta forms. *}
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lemma has_derivative_within': |
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"(f has_derivative f')(at x within s) \<longleftrightarrow> bounded_linear f' \<and> |
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(\<forall>e>0. \<exists>d>0. \<forall>x'\<in>s. 0 < norm(x' - x) \<and> norm(x' - x) < d |
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\<longrightarrow> norm(f x' - f x - f'(x' - x)) / norm(x' - x) < e)" |
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unfolding has_derivative_within Lim_within vector_dist_norm |
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unfolding diff_0_right norm_mul by(simp add: group_simps) |
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lemma has_derivative_at': |
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"(f has_derivative f') (at x) \<longleftrightarrow> bounded_linear f' \<and> |
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(\<forall>e>0. \<exists>d>0. \<forall>x'. 0 < norm(x' - x) \<and> norm(x' - x) < d |
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\<longrightarrow> norm(f x' - f x - f'(x' - x)) / norm(x' - x) < e)" |
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apply(subst within_UNIV[THEN sym]) unfolding has_derivative_within' by auto |
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lemma has_derivative_at_within: "(f has_derivative f') (at x) \<Longrightarrow> (f has_derivative f') (at x within s)" |
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unfolding has_derivative_within' has_derivative_at' by meson |
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lemma has_derivative_within_open: |
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"a \<in> s \<Longrightarrow> open s \<Longrightarrow> ((f has_derivative f') (at a within s) \<longleftrightarrow> (f has_derivative f') (at a))" |
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unfolding has_derivative_within has_derivative_at using Lim_within_open by auto |
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subsection {* Derivatives on real = Derivatives on real^1 *}
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lemma dist_vec1_0[simp]: "dist(vec1 (x::real)) 0 = norm x" unfolding vector_dist_norm by(auto simp add:vec1_dest_vec1_simps) |
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lemma bounded_linear_vec1_dest_vec1: fixes f::"real \<Rightarrow> real" |
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shows "linear (vec1 \<circ> f \<circ> dest_vec1) = bounded_linear f" (is "?l = ?r") proof- |
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{ assume ?l guess K using linear_bounded[OF `?l`] ..
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hence "\<exists>K. \<forall>x. \<bar>f x\<bar> \<le> \<bar>x\<bar> * K" apply(rule_tac x=K in exI) |
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unfolding vec1_dest_vec1_simps by (auto simp add:field_simps) } |
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thus ?thesis unfolding linear_def bounded_linear_def additive_def bounded_linear_axioms_def o_def |
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unfolding vec1_dest_vec1_simps by auto qed |
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lemma has_derivative_within_vec1_dest_vec1: fixes f::"real\<Rightarrow>real" shows |
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91 |
"((vec1 \<circ> f \<circ> dest_vec1) has_derivative (vec1 \<circ> f' \<circ> dest_vec1)) (at (vec1 x) within vec1 ` s) |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
92 |
= (f has_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
93 |
unfolding has_derivative_within unfolding bounded_linear_vec1_dest_vec1[unfolded linear_conv_bounded_linear] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
94 |
unfolding o_def Lim_within Ball_def unfolding forall_vec1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
95 |
unfolding vec1_dest_vec1_simps dist_vec1_0 image_iff by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
96 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
97 |
lemma has_derivative_at_vec1_dest_vec1: fixes f::"real\<Rightarrow>real" shows |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
98 |
"((vec1 \<circ> f \<circ> dest_vec1) has_derivative (vec1 \<circ> f' \<circ> dest_vec1)) (at (vec1 x)) = (f has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
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|
99 |
using has_derivative_within_vec1_dest_vec1[where s=UNIV, unfolded range_vec1 within_UNIV] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
100 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
101 |
lemma bounded_linear_vec1: fixes f::"'a::real_normed_vector\<Rightarrow>real" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
102 |
shows "bounded_linear f = bounded_linear (vec1 \<circ> f)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
103 |
unfolding bounded_linear_def additive_def bounded_linear_axioms_def o_def |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
104 |
unfolding vec1_dest_vec1_simps by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
105 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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106 |
lemma bounded_linear_dest_vec1: fixes f::"real\<Rightarrow>'a::real_normed_vector" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
107 |
shows "bounded_linear f = bounded_linear (f \<circ> dest_vec1)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
108 |
unfolding bounded_linear_def additive_def bounded_linear_axioms_def o_def |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
109 |
unfolding vec1_dest_vec1_simps by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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110 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
111 |
lemma has_derivative_at_vec1: fixes f::"'a::real_normed_vector\<Rightarrow>real" shows |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
112 |
"(f has_derivative f') (at x) = ((vec1 \<circ> f) has_derivative (vec1 \<circ> f')) (at x)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
113 |
unfolding has_derivative_at unfolding bounded_linear_vec1[unfolded linear_conv_bounded_linear] |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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114 |
unfolding o_def Lim_at unfolding vec1_dest_vec1_simps dist_vec1_0 by auto |
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115 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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116 |
lemma has_derivative_within_dest_vec1:fixes f::"real\<Rightarrow>'a::real_normed_vector" shows |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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117 |
"((f \<circ> dest_vec1) has_derivative (f' \<circ> dest_vec1)) (at (vec1 x) within vec1 ` s) = (f has_derivative f') (at x within s)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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118 |
unfolding has_derivative_within bounded_linear_dest_vec1 unfolding o_def Lim_within Ball_def |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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119 |
unfolding vec1_dest_vec1_simps dist_vec1_0 image_iff by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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120 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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121 |
lemma has_derivative_at_dest_vec1:fixes f::"real\<Rightarrow>'a::real_normed_vector" shows |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
122 |
"((f \<circ> dest_vec1) has_derivative (f' \<circ> dest_vec1)) (at (vec1 x)) = (f has_derivative f') (at x)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
123 |
using has_derivative_within_dest_vec1[where s=UNIV] by(auto simp add:within_UNIV) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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124 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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125 |
lemma derivative_is_linear: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" shows |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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126 |
"(f has_derivative f') net \<Longrightarrow> linear f'" |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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127 |
unfolding has_derivative_def and linear_conv_bounded_linear by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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128 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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129 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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130 |
subsection {* Combining theorems. *}
|
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131 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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132 |
lemma (in bounded_linear) has_derivative: "(f has_derivative f) net" |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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133 |
unfolding has_derivative_def apply(rule,rule bounded_linear_axioms) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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134 |
unfolding diff by(simp add: Lim_const) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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135 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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136 |
lemma has_derivative_id: "((\<lambda>x. x) has_derivative (\<lambda>h. h)) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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137 |
apply(rule bounded_linear.has_derivative) using bounded_linear_ident[unfolded id_def] by simp |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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138 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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139 |
lemma has_derivative_const: "((\<lambda>x. c) has_derivative (\<lambda>h. 0)) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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140 |
unfolding has_derivative_def apply(rule,rule bounded_linear_zero) by(simp add: Lim_const) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
141 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
142 |
lemma (in bounded_linear) cmul: shows "bounded_linear (\<lambda>x. (c::real) *\<^sub>R f x)" proof |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
143 |
guess K using pos_bounded .. |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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144 |
thus "\<exists>K. \<forall>x. norm ((c::real) *\<^sub>R f x) \<le> norm x * K" apply(rule_tac x="abs c * K" in exI) proof |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
145 |
fix x case goal1 |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
146 |
hence "abs c * norm (f x) \<le> abs c * (norm x * K)" apply-apply(erule conjE,erule_tac x=x in allE) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
147 |
apply(rule mult_left_mono) by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
148 |
thus ?case by(auto simp add:field_simps) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
149 |
qed qed(auto simp add: scaleR.add_right add scaleR) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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150 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
151 |
lemma has_derivative_cmul: assumes "(f has_derivative f') net" shows "((\<lambda>x. c *\<^sub>R f(x)) has_derivative (\<lambda>h. c *\<^sub>R f'(h))) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
152 |
unfolding has_derivative_def apply(rule,rule bounded_linear.cmul) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
153 |
using assms[unfolded has_derivative_def] using Lim_cmul[OF assms[unfolded has_derivative_def,THEN conjunct2]] |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
154 |
unfolding scaleR_right_diff_distrib scaleR_right_distrib by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
155 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
156 |
lemma has_derivative_cmul_eq: assumes "c \<noteq> 0" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
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|
157 |
shows "(((\<lambda>x. c *\<^sub>R f(x)) has_derivative (\<lambda>h. c *\<^sub>R f'(h))) net \<longleftrightarrow> (f has_derivative f') net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
158 |
apply(rule) defer apply(rule has_derivative_cmul,assumption) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
159 |
apply(drule has_derivative_cmul[where c="1/c"]) using assms by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
160 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
161 |
lemma has_derivative_neg: |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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diff
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|
162 |
"(f has_derivative f') net \<Longrightarrow> ((\<lambda>x. -(f x)) has_derivative (\<lambda>h. -(f' h))) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
163 |
apply(drule has_derivative_cmul[where c="-1"]) by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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164 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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165 |
lemma has_derivative_neg_eq: "((\<lambda>x. -(f x)) has_derivative (\<lambda>h. -(f' h))) net \<longleftrightarrow> (f has_derivative f') net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
166 |
apply(rule, drule_tac[!] has_derivative_neg) by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
167 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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168 |
lemma has_derivative_add: assumes "(f has_derivative f') net" "(g has_derivative g') net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
169 |
shows "((\<lambda>x. f(x) + g(x)) has_derivative (\<lambda>h. f'(h) + g'(h))) net" proof- |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
170 |
note as = assms[unfolded has_derivative_def] |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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171 |
show ?thesis unfolding has_derivative_def apply(rule,rule bounded_linear_add) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
172 |
using Lim_add[OF as(1)[THEN conjunct2] as(2)[THEN conjunct2]] and as |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
173 |
by(auto simp add:group_simps scaleR_right_diff_distrib scaleR_right_distrib) qed |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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174 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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175 |
lemma has_derivative_add_const:"(f has_derivative f') net \<Longrightarrow> ((\<lambda>x. f x + c) has_derivative f') net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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176 |
apply(drule has_derivative_add) apply(rule has_derivative_const) by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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177 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
178 |
lemma has_derivative_sub: |
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4c414d0835ab
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179 |
"(f has_derivative f') net \<Longrightarrow> (g has_derivative g') net \<Longrightarrow> ((\<lambda>x. f(x) - g(x)) has_derivative (\<lambda>h. f'(h) - g'(h))) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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180 |
apply(drule has_derivative_add) apply(drule has_derivative_neg,assumption) by(simp add:group_simps) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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181 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
182 |
lemma has_derivative_setsum: assumes "finite s" "\<forall>a\<in>s. ((f a) has_derivative (f' a)) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
183 |
shows "((\<lambda>x. setsum (\<lambda>a. f a x) s) has_derivative (\<lambda>h. setsum (\<lambda>a. f' a h) s)) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
184 |
apply(induct_tac s rule:finite_subset_induct[where A=s]) apply(rule assms(1)) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
185 |
proof- fix x F assume as:"finite F" "x \<notin> F" "x\<in>s" "((\<lambda>x. \<Sum>a\<in>F. f a x) has_derivative (\<lambda>h. \<Sum>a\<in>F. f' a h)) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
186 |
thus "((\<lambda>xa. \<Sum>a\<in>insert x F. f a xa) has_derivative (\<lambda>h. \<Sum>a\<in>insert x F. f' a h)) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
187 |
unfolding setsum_insert[OF as(1,2)] apply-apply(rule has_derivative_add) apply(rule assms(2)[rule_format]) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
188 |
qed(auto intro!: has_derivative_const) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
189 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
190 |
lemma has_derivative_setsum_numseg: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
191 |
"\<forall>i. m \<le> i \<and> i \<le> n \<longrightarrow> ((f i) has_derivative (f' i)) net \<Longrightarrow> |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
192 |
((\<lambda>x. setsum (\<lambda>i. f i x) {m..n::nat}) has_derivative (\<lambda>h. setsum (\<lambda>i. f' i h) {m..n})) net"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
193 |
apply(rule has_derivative_setsum) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
194 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
195 |
subsection {* somewhat different results for derivative of scalar multiplier. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
196 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
197 |
lemma has_derivative_vmul_component: fixes c::"real^'a::finite \<Rightarrow> real^'b::finite" and v::"real^'c::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
198 |
assumes "(c has_derivative c') net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
199 |
shows "((\<lambda>x. c(x)$k *\<^sub>R v) has_derivative (\<lambda>x. (c' x)$k *\<^sub>R v)) net" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
200 |
have *:"\<And>y. (c y $ k *\<^sub>R v - (c (netlimit net) $ k *\<^sub>R v + c' (y - netlimit net) $ k *\<^sub>R v)) = |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
201 |
(c y $ k - (c (netlimit net) $ k + c' (y - netlimit net) $ k)) *\<^sub>R v" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
202 |
unfolding scaleR_left_diff_distrib scaleR_left_distrib by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
203 |
show ?thesis unfolding has_derivative_def and * and linear_conv_bounded_linear[symmetric] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
204 |
apply(rule,rule linear_vmul_component[of c' k v, unfolded smult_conv_scaleR]) defer |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
205 |
apply(subst vector_smult_lzero[THEN sym, of v]) unfolding scaleR_scaleR smult_conv_scaleR apply(rule Lim_vmul) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
206 |
using assms[unfolded has_derivative_def] unfolding Lim o_def apply- apply(cases "trivial_limit net") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
207 |
apply(rule,assumption,rule disjI2,rule,rule) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
208 |
have *:"\<And>x. x - vec 0 = (x::real^'n)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
209 |
have **:"\<And>d x. d * (c x $ k - (c (netlimit net) $ k + c' (x - netlimit net) $ k)) = (d *\<^sub>R (c x - (c (netlimit net) + c' (x - netlimit net) ))) $k" by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
210 |
fix e assume "\<not> trivial_limit net" "0 < (e::real)" |
|
34103
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
211 |
then have "eventually (\<lambda>x. dist ((1 / norm (x - netlimit net)) *\<^sub>R (c x - (c (netlimit net) + c' (x - netlimit net)))) 0 < e) net" |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
212 |
using assms[unfolded has_derivative_def Lim] by auto |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
213 |
thus "eventually (\<lambda>x. dist (1 / norm (x - netlimit net) * (c x $ k - (c (netlimit net) $ k + c' (x - netlimit net) $ k))) 0 < e) net" |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
214 |
proof (rule eventually_elim1) |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
215 |
case goal1 thus ?case apply - unfolding vector_dist_norm vec1_vec apply(rule le_less_trans) prefer 2 apply assumption unfolding * ** and norm_vec1[unfolded vec1_vec] |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
216 |
using component_le_norm[of "(1 / norm (x - netlimit net)) *\<^sub>R (c x - (c (netlimit net) + c' (x - netlimit net))) - 0" k] by auto |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
217 |
qed |
|
9095ba4d2cd4
make proof use only abstract properties of eventually
huffman
parents:
33759
diff
changeset
|
218 |
qed(insert assms[unfolded has_derivative_def], auto simp add:linear_conv_bounded_linear) qed |
|
33741
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
219 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
220 |
lemma has_derivative_vmul_within: fixes c::"real \<Rightarrow> real" and v::"real^'a::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
221 |
assumes "(c has_derivative c') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
222 |
shows "((\<lambda>x. (c x) *\<^sub>R v) has_derivative (\<lambda>x. (c' x) *\<^sub>R v)) (at x within s)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
223 |
have *:"\<And>c. (\<lambda>x. (vec1 \<circ> c \<circ> dest_vec1) x $ 1 *\<^sub>R v) = (\<lambda>x. (c x) *\<^sub>R v) \<circ> dest_vec1" unfolding o_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
224 |
show ?thesis using has_derivative_vmul_component[of "vec1 \<circ> c \<circ> dest_vec1" "vec1 \<circ> c' \<circ> dest_vec1" "at (vec1 x) within vec1 ` s" 1 v] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
225 |
unfolding * and has_derivative_within_vec1_dest_vec1 unfolding has_derivative_within_dest_vec1 using assms by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
226 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
227 |
lemma has_derivative_vmul_at: fixes c::"real \<Rightarrow> real" and v::"real^'a::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
228 |
assumes "(c has_derivative c') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
229 |
shows "((\<lambda>x. (c x) *\<^sub>R v) has_derivative (\<lambda>x. (c' x) *\<^sub>R v)) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
230 |
using has_derivative_vmul_within[where s=UNIV] and assms by(auto simp add: within_UNIV) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
231 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
232 |
lemma has_derivative_lift_dot: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
233 |
assumes "(f has_derivative f') net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
234 |
shows "((\<lambda>x. inner v (f x)) has_derivative (\<lambda>t. inner v (f' t))) net" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
235 |
show ?thesis using assms unfolding has_derivative_def apply- apply(erule conjE,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
236 |
apply(rule bounded_linear_compose[of _ f']) apply(rule inner.bounded_linear_right,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
237 |
apply(drule Lim_inner[where a=v]) unfolding o_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
238 |
by(auto simp add:inner.scaleR_right inner.add_right inner.diff_right) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
239 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
240 |
lemmas has_derivative_intros = has_derivative_sub has_derivative_add has_derivative_cmul has_derivative_id has_derivative_const |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
241 |
has_derivative_neg has_derivative_vmul_component has_derivative_vmul_at has_derivative_vmul_within has_derivative_cmul |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
242 |
bounded_linear.has_derivative has_derivative_lift_dot |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
243 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
244 |
subsection {* limit transformation for derivatives. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
245 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
246 |
lemma has_derivative_transform_within: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
247 |
assumes "0 < d" "x \<in> s" "\<forall>x'\<in>s. dist x' x < d \<longrightarrow> f x' = g x'" "(f has_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
248 |
shows "(g has_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
249 |
using assms(4) unfolding has_derivative_within apply- apply(erule conjE,rule,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
250 |
apply(rule Lim_transform_within[OF assms(1)]) defer apply assumption |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
251 |
apply(rule,rule) apply(drule assms(3)[rule_format]) using assms(3)[rule_format, OF assms(2)] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
252 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
253 |
lemma has_derivative_transform_at: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
254 |
assumes "0 < d" "\<forall>x'. dist x' x < d \<longrightarrow> f x' = g x'" "(f has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
255 |
shows "(g has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
256 |
apply(subst within_UNIV[THEN sym]) apply(rule has_derivative_transform_within[OF assms(1)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
257 |
using assms(2-3) unfolding within_UNIV by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
258 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
259 |
lemma has_derivative_transform_within_open: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
260 |
assumes "open s" "x \<in> s" "\<forall>y\<in>s. f y = g y" "(f has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
261 |
shows "(g has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
262 |
using assms(4) unfolding has_derivative_at apply- apply(erule conjE,rule,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
263 |
apply(rule Lim_transform_within_open[OF assms(1,2)]) defer apply assumption |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
264 |
apply(rule,rule) apply(drule assms(3)[rule_format]) using assms(3)[rule_format, OF assms(2)] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
265 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
266 |
subsection {* differentiability. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
267 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
268 |
definition differentiable :: "('a::real_normed_vector \<Rightarrow> 'b::real_normed_vector) \<Rightarrow> 'a net \<Rightarrow> bool" (infixr "differentiable" 30) where
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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"f differentiable net \<equiv> (\<exists>f'. (f has_derivative f') net)" |
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270 |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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271 |
definition differentiable_on :: "('a::real_normed_vector \<Rightarrow> 'b::real_normed_vector) \<Rightarrow> 'a set \<Rightarrow> bool" (infixr "differentiable'_on" 30) where
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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272 |
"f differentiable_on s \<equiv> (\<forall>x\<in>s. f differentiable (at x within s))" |
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273 |
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274 |
lemma differentiableI: "(f has_derivative f') net \<Longrightarrow> f differentiable net" |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
275 |
unfolding differentiable_def by auto |
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276 |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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277 |
lemma differentiable_at_withinI: "f differentiable (at x) \<Longrightarrow> f differentiable (at x within s)" |
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parents:
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|
278 |
unfolding differentiable_def using has_derivative_at_within by blast |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
279 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
280 |
lemma differentiable_within_open: assumes "a \<in> s" "open s" shows |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
281 |
"f differentiable (at a within s) \<longleftrightarrow> (f differentiable (at a))" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
282 |
unfolding differentiable_def has_derivative_within_open[OF assms] by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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283 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
284 |
lemma differentiable_at_imp_differentiable_on: "(\<forall>x\<in>(s::(real^'n::finite) set). f differentiable at x) \<Longrightarrow> f differentiable_on s" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
285 |
unfolding differentiable_on_def by(auto intro!: differentiable_at_withinI) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
286 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
287 |
lemma differentiable_on_eq_differentiable_at: "open s \<Longrightarrow> (f differentiable_on s \<longleftrightarrow> (\<forall>x\<in>s. f differentiable at x))" |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
288 |
unfolding differentiable_on_def by(auto simp add: differentiable_within_open) |
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4c414d0835ab
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289 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
290 |
lemma differentiable_transform_within: |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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291 |
assumes "0 < d" "x \<in> s" "\<forall>x'\<in>s. dist x' x < d \<longrightarrow> f x' = g x'" "f differentiable (at x within s)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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292 |
shows "g differentiable (at x within s)" |
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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using assms(4) unfolding differentiable_def by(auto intro!: has_derivative_transform_within[OF assms(1-3)]) |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
294 |
|
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Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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295 |
lemma differentiable_transform_at: |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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296 |
assumes "0 < d" "\<forall>x'. dist x' x < d \<longrightarrow> f x' = g x'" "f differentiable at x" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
297 |
shows "g differentiable at x" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
298 |
using assms(3) unfolding differentiable_def using has_derivative_transform_at[OF assms(1-2)] by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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299 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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300 |
subsection {* Frechet derivative and Jacobian matrix. *}
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4c414d0835ab
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301 |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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definition "frechet_derivative f net = (SOME f'. (f has_derivative f') net)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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303 |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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304 |
lemma frechet_derivative_works: |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
305 |
"f differentiable net \<longleftrightarrow> (f has_derivative (frechet_derivative f net)) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
306 |
unfolding frechet_derivative_def differentiable_def and some_eq_ex[of "\<lambda> f' . (f has_derivative f') net"] .. |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
307 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
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|
308 |
lemma linear_frechet_derivative: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
309 |
shows "f differentiable net \<Longrightarrow> linear(frechet_derivative f net)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
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|
310 |
unfolding frechet_derivative_works has_derivative_def unfolding linear_conv_bounded_linear by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
311 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
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|
312 |
definition "jacobian f net = matrix(frechet_derivative f net)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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|
313 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
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parents:
diff
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|
314 |
lemma jacobian_works: "(f::(real^'a::finite) \<Rightarrow> (real^'b::finite)) differentiable net \<longleftrightarrow> (f has_derivative (\<lambda>h. (jacobian f net) *v h)) net" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
315 |
apply rule unfolding jacobian_def apply(simp only: matrix_works[OF linear_frechet_derivative]) defer |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
316 |
apply(rule differentiableI) apply assumption unfolding frechet_derivative_works by assumption |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
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diff
changeset
|
317 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
318 |
subsection {* Differentiability implies continuity. *}
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
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|
319 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
320 |
lemma Lim_mul_norm_within: fixes f::"'a::real_normed_vector \<Rightarrow> 'b::real_normed_vector" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
321 |
shows "(f ---> 0) (at a within s) \<Longrightarrow> ((\<lambda>x. norm(x - a) *\<^sub>R f(x)) ---> 0) (at a within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
322 |
unfolding Lim_within apply(rule,rule) apply(erule_tac x=e in allE,erule impE,assumption,erule exE,erule conjE) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
323 |
apply(rule_tac x="min d 1" in exI) apply rule defer apply(rule,erule_tac x=x in ballE) unfolding vector_dist_norm diff_0_right norm_mul |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
324 |
by(auto intro!: mult_strict_mono[of _ "1::real", unfolded mult_1_left]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
325 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
326 |
lemma differentiable_imp_continuous_within: assumes "f differentiable (at x within s)" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
327 |
shows "continuous (at x within s) f" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
328 |
from assms guess f' unfolding differentiable_def has_derivative_within .. note f'=this |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
329 |
then interpret bounded_linear f' by auto |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
330 |
have *:"\<And>xa. x\<noteq>xa \<Longrightarrow> (f' \<circ> (\<lambda>y. y - x)) xa + norm (xa - x) *\<^sub>R ((1 / norm (xa - x)) *\<^sub>R (f xa - (f x + f' (xa - x)))) - ((f' \<circ> (\<lambda>y. y - x)) x + 0) = f xa - f x" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
331 |
using zero by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
332 |
have **:"continuous (at x within s) (f' \<circ> (\<lambda>y. y - x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
333 |
apply(rule continuous_within_compose) apply(rule continuous_intros)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
334 |
by(rule linear_continuous_within[OF f'[THEN conjunct1]]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
335 |
show ?thesis unfolding continuous_within using f'[THEN conjunct2, THEN Lim_mul_norm_within] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
336 |
apply-apply(drule Lim_add) apply(rule **[unfolded continuous_within]) unfolding Lim_within and vector_dist_norm |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
337 |
apply(rule,rule) apply(erule_tac x=e in allE) apply(erule impE|assumption)+ apply(erule exE,rule_tac x=d in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
338 |
by(auto simp add:zero * elim!:allE) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
339 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
340 |
lemma differentiable_imp_continuous_at: "f differentiable at x \<Longrightarrow> continuous (at x) f" |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
341 |
by(rule differentiable_imp_continuous_within[of _ x UNIV, unfolded within_UNIV]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
342 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
343 |
lemma differentiable_imp_continuous_on: "f differentiable_on s \<Longrightarrow> continuous_on s f" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
344 |
unfolding differentiable_on_def continuous_on_eq_continuous_within |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
345 |
using differentiable_imp_continuous_within by blast |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
346 |
|
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
347 |
lemma has_derivative_within_subset: |
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4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
348 |
"(f has_derivative f') (at x within s) \<Longrightarrow> t \<subseteq> s \<Longrightarrow> (f has_derivative f') (at x within t)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
349 |
unfolding has_derivative_within using Lim_within_subset by blast |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
350 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
351 |
lemma differentiable_within_subset: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
352 |
"f differentiable (at x within t) \<Longrightarrow> s \<subseteq> t \<Longrightarrow> f differentiable (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
353 |
unfolding differentiable_def using has_derivative_within_subset by blast |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
354 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
355 |
lemma differentiable_on_subset: "f differentiable_on t \<Longrightarrow> s \<subseteq> t \<Longrightarrow> f differentiable_on s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
356 |
unfolding differentiable_on_def using differentiable_within_subset by blast |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
357 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
358 |
lemma differentiable_on_empty: "f differentiable_on {}"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
359 |
unfolding differentiable_on_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
360 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
361 |
subsection {* Several results are easier using a "multiplied-out" variant. *)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
362 |
(* (I got this idea from Dieudonne's proof of the chain rule). *} |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
363 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
364 |
lemma has_derivative_within_alt: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
365 |
"(f has_derivative f') (at x within s) \<longleftrightarrow> bounded_linear f' \<and> |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
366 |
(\<forall>e>0. \<exists>d>0. \<forall>y\<in>s. norm(y - x) < d \<longrightarrow> norm(f(y) - f(x) - f'(y - x)) \<le> e * norm(y - x))" (is "?lhs \<longleftrightarrow> ?rhs") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
367 |
proof assume ?lhs thus ?rhs unfolding has_derivative_within apply-apply(erule conjE,rule,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
368 |
unfolding Lim_within apply(rule,erule_tac x=e in allE,rule,erule impE,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
369 |
apply(erule exE,rule_tac x=d in exI) apply(erule conjE,rule,assumption,rule,rule) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
370 |
fix x y e d assume as:"0 < e" "0 < d" "norm (y - x) < d" "\<forall>xa\<in>s. 0 < dist xa x \<and> dist xa x < d \<longrightarrow> |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
371 |
dist ((1 / norm (xa - x)) *\<^sub>R (f xa - (f x + f' (xa - x)))) 0 < e" "y \<in> s" "bounded_linear f'" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
372 |
then interpret bounded_linear f' by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
373 |
show "norm (f y - f x - f' (y - x)) \<le> e * norm (y - x)" proof(cases "y=x") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
374 |
case True thus ?thesis using `bounded_linear f'` by(auto simp add: zero) next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
375 |
case False hence "norm (f y - (f x + f' (y - x))) < e * norm (y - x)" using as(4)[rule_format, OF `y\<in>s`] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
376 |
unfolding vector_dist_norm diff_0_right norm_mul using as(3) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
377 |
using pos_divide_less_eq[OF False[unfolded dist_nz], unfolded vector_dist_norm] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
378 |
by(auto simp add:linear_0 linear_sub group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
379 |
thus ?thesis by(auto simp add:group_simps) qed qed next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
380 |
assume ?rhs thus ?lhs unfolding has_derivative_within Lim_within apply-apply(erule conjE,rule,assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
381 |
apply(rule,erule_tac x="e/2" in allE,rule,erule impE) defer apply(erule exE,rule_tac x=d in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
382 |
apply(erule conjE,rule,assumption,rule,rule) unfolding vector_dist_norm diff_0_right norm_scaleR |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
383 |
apply(erule_tac x=xa in ballE,erule impE) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
384 |
fix e d y assume "bounded_linear f'" "0 < e" "0 < d" "y \<in> s" "0 < norm (y - x) \<and> norm (y - x) < d" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
385 |
"norm (f y - f x - f' (y - x)) \<le> e / 2 * norm (y - x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
386 |
thus "\<bar>1 / norm (y - x)\<bar> * norm (f y - (f x + f' (y - x))) < e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
387 |
apply(rule_tac le_less_trans[of _ "e/2"]) by(auto intro!:mult_imp_div_pos_le simp add:group_simps) qed auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
388 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
389 |
lemma has_derivative_at_alt: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
390 |
"(f has_derivative f') (at (x::real^'n::finite)) \<longleftrightarrow> bounded_linear f' \<and> |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
391 |
(\<forall>e>0. \<exists>d>0. \<forall>y. norm(y - x) < d \<longrightarrow> norm(f y - f x - f'(y - x)) \<le> e * norm(y - x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
392 |
using has_derivative_within_alt[where s=UNIV] unfolding within_UNIV by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
393 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
394 |
subsection {* The chain rule. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
395 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
396 |
lemma diff_chain_within: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
397 |
assumes "(f has_derivative f') (at x within s)" "(g has_derivative g') (at (f x) within (f ` s))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
398 |
shows "((g o f) has_derivative (g' o f'))(at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
399 |
unfolding has_derivative_within_alt apply(rule,rule bounded_linear_compose[unfolded o_def[THEN sym]]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
400 |
apply(rule assms(2)[unfolded has_derivative_def,THEN conjE],assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
401 |
apply(rule assms(1)[unfolded has_derivative_def,THEN conjE],assumption) proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
402 |
note assms = assms[unfolded has_derivative_within_alt] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
403 |
fix e::real assume "0<e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
404 |
guess B1 using bounded_linear.pos_bounded[OF assms(1)[THEN conjunct1, rule_format]] .. note B1 = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
405 |
guess B2 using bounded_linear.pos_bounded[OF assms(2)[THEN conjunct1, rule_format]] .. note B2 = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
406 |
have *:"e / 2 / B2 > 0" using `e>0` B2 apply-apply(rule divide_pos_pos) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
407 |
guess d1 using assms(1)[THEN conjunct2, rule_format, OF *] .. note d1 = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
408 |
have *:"e / 2 / (1 + B1) > 0" using `e>0` B1 apply-apply(rule divide_pos_pos) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
409 |
guess de using assms(2)[THEN conjunct2, rule_format, OF *] .. note de = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
410 |
guess d2 using assms(1)[THEN conjunct2, rule_format, OF zero_less_one] .. note d2 = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
411 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
412 |
def d0 \<equiv> "(min d1 d2)/2" have d0:"d0>0" "d0 < d1" "d0 < d2" unfolding d0_def using d1 d2 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
413 |
def d \<equiv> "(min d0 (de / (B1 + 1))) / 2" have "de * 2 / (B1 + 1) > de / (B1 + 1)" apply(rule divide_strict_right_mono) using B1 de by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
414 |
hence d:"d>0" "d < d1" "d < d2" "d < (de / (B1 + 1))" unfolding d_def using d0 d1 d2 de B1 by(auto intro!: divide_pos_pos simp add:min_less_iff_disj not_less) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
415 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
416 |
show "\<exists>d>0. \<forall>y\<in>s. norm (y - x) < d \<longrightarrow> norm ((g \<circ> f) y - (g \<circ> f) x - (g' \<circ> f') (y - x)) \<le> e * norm (y - x)" apply(rule_tac x=d in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
417 |
proof(rule,rule `d>0`,rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
418 |
fix y assume as:"y \<in> s" "norm (y - x) < d" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
419 |
hence 1:"norm (f y - f x - f' (y - x)) \<le> min (norm (y - x)) (e / 2 / B2 * norm (y - x))" using d1 d2 d by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
420 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
421 |
have "norm (f y - f x) \<le> norm (f y - f x - f' (y - x)) + norm (f' (y - x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
422 |
using norm_triangle_sub[of "f y - f x" "f' (y - x)"] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
423 |
also have "\<dots> \<le> norm (f y - f x - f' (y - x)) + B1 * norm (y - x)" apply(rule add_left_mono) using B1 by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
424 |
also have "\<dots> \<le> min (norm (y - x)) (e / 2 / B2 * norm (y - x)) + B1 * norm (y - x)" apply(rule add_right_mono) using d1 d2 d as by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
425 |
also have "\<dots> \<le> norm (y - x) + B1 * norm (y - x)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
426 |
also have "\<dots> = norm (y - x) * (1 + B1)" by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
427 |
finally have 3:"norm (f y - f x) \<le> norm (y - x) * (1 + B1)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
428 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
429 |
hence "norm (f y - f x) \<le> d * (1 + B1)" apply- apply(rule order_trans,assumption,rule mult_right_mono) using as B1 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
430 |
also have "\<dots> < de" using d B1 by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
431 |
finally have "norm (g (f y) - g (f x) - g' (f y - f x)) \<le> e / 2 / (1 + B1) * norm (f y - f x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
432 |
apply-apply(rule de[THEN conjunct2,rule_format]) using `y\<in>s` using d as by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
433 |
also have "\<dots> = (e / 2) * (1 / (1 + B1) * norm (f y - f x))" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
434 |
also have "\<dots> \<le> e / 2 * norm (y - x)" apply(rule mult_left_mono) using `e>0` and 3 using B1 and `e>0` by(auto simp add:divide_le_eq) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
435 |
finally have 4:"norm (g (f y) - g (f x) - g' (f y - f x)) \<le> e / 2 * norm (y - x)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
436 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
437 |
interpret g': bounded_linear g' using assms(2) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
438 |
interpret f': bounded_linear f' using assms(1) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
439 |
have "norm (- g' (f' (y - x)) + g' (f y - f x)) = norm (g' (f y - f x - f' (y - x)))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
440 |
by(auto simp add:group_simps f'.diff g'.diff g'.add) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
441 |
also have "\<dots> \<le> B2 * norm (f y - f x - f' (y - x))" using B2 by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
442 |
also have "\<dots> \<le> B2 * (e / 2 / B2 * norm (y - x))" apply(rule mult_left_mono) using as d1 d2 d B2 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
443 |
also have "\<dots> \<le> e / 2 * norm (y - x)" using B2 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
444 |
finally have 5:"norm (- g' (f' (y - x)) + g' (f y - f x)) \<le> e / 2 * norm (y - x)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
445 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
446 |
have "norm (g (f y) - g (f x) - g' (f y - f x)) + norm (g (f y) - g (f x) - g' (f' (y - x)) - (g (f y) - g (f x) - g' (f y - f x))) \<le> e * norm (y - x)" using 5 4 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
447 |
thus "norm ((g \<circ> f) y - (g \<circ> f) x - (g' \<circ> f') (y - x)) \<le> e * norm (y - x)" unfolding o_def apply- apply(rule order_trans, rule norm_triangle_sub) by assumption qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
448 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
449 |
lemma diff_chain_at: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
450 |
"(f has_derivative f') (at x) \<Longrightarrow> (g has_derivative g') (at (f x)) \<Longrightarrow> ((g o f) has_derivative (g' o f')) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
451 |
using diff_chain_within[of f f' x UNIV g g'] using has_derivative_within_subset[of g g' "f x" UNIV "range f"] unfolding within_UNIV by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
452 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
453 |
subsection {* Composition rules stated just for differentiability. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
454 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
455 |
lemma differentiable_const[intro]: "(\<lambda>z. c) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
456 |
unfolding differentiable_def using has_derivative_const by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
457 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
458 |
lemma differentiable_id[intro]: "(\<lambda>z. z) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
459 |
unfolding differentiable_def using has_derivative_id by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
460 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
461 |
lemma differentiable_cmul[intro]: "f differentiable net \<Longrightarrow> (\<lambda>x. c *\<^sub>R f(x)) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
462 |
unfolding differentiable_def apply(erule exE, drule has_derivative_cmul) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
463 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
464 |
lemma differentiable_neg[intro]: "f differentiable net \<Longrightarrow> (\<lambda>z. -(f z)) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
465 |
unfolding differentiable_def apply(erule exE, drule has_derivative_neg) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
466 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
467 |
lemma differentiable_add: "f differentiable net \<Longrightarrow> g differentiable net |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
468 |
\<Longrightarrow> (\<lambda>z. f z + g z) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
469 |
unfolding differentiable_def apply(erule exE)+ apply(rule_tac x="\<lambda>z. f' z + f'a z" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
470 |
apply(rule has_derivative_add) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
471 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
472 |
lemma differentiable_sub: "f differentiable net \<Longrightarrow> g differentiable net |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
473 |
\<Longrightarrow> (\<lambda>z. f z - g z) differentiable (net::'a::real_normed_vector net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
474 |
unfolding differentiable_def apply(erule exE)+ apply(rule_tac x="\<lambda>z. f' z - f'a z" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
475 |
apply(rule has_derivative_sub) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
476 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
477 |
lemma differentiable_setsum: fixes f::"'a \<Rightarrow> (real^'n::finite \<Rightarrow>real^'n)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
478 |
assumes "finite s" "\<forall>a\<in>s. (f a) differentiable net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
479 |
shows "(\<lambda>x. setsum (\<lambda>a. f a x) s) differentiable net" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
480 |
guess f' using bchoice[OF assms(2)[unfolded differentiable_def]] .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
481 |
thus ?thesis unfolding differentiable_def apply- apply(rule,rule has_derivative_setsum[where f'=f'],rule assms(1)) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
482 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
483 |
lemma differentiable_setsum_numseg: fixes f::"_ \<Rightarrow> (real^'n::finite \<Rightarrow>real^'n)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
484 |
shows "\<forall>i. m \<le> i \<and> i \<le> n \<longrightarrow> (f i) differentiable net \<Longrightarrow> (\<lambda>x. setsum (\<lambda>a. f a x) {m::nat..n}) differentiable net"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
485 |
apply(rule differentiable_setsum) using finite_atLeastAtMost[of n m] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
486 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
487 |
lemma differentiable_chain_at: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
488 |
"f differentiable (at x) \<Longrightarrow> g differentiable (at(f x)) \<Longrightarrow> (g o f) differentiable (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
489 |
unfolding differentiable_def by(meson diff_chain_at) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
490 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
491 |
lemma differentiable_chain_within: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
492 |
"f differentiable (at x within s) \<Longrightarrow> g differentiable (at(f x) within (f ` s)) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
493 |
\<Longrightarrow> (g o f) differentiable (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
494 |
unfolding differentiable_def by(meson diff_chain_within) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
495 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
496 |
subsection {* Uniqueness of derivative. *)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
497 |
(* *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
498 |
(* The general result is a bit messy because we need approachability of the *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
499 |
(* limit point from any direction. But OK for nontrivial intervals etc. *} |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
500 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
501 |
lemma frechet_derivative_unique_within: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
502 |
assumes "(f has_derivative f') (at x within s)" "(f has_derivative f'') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
503 |
"(\<forall>i::'a::finite. \<forall>e>0. \<exists>d. 0 < abs(d) \<and> abs(d) < e \<and> (x + d *\<^sub>R basis i) \<in> s)" shows "f' = f''" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
504 |
note as = assms(1,2)[unfolded has_derivative_def] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
505 |
then interpret f': bounded_linear f' by auto from as interpret f'': bounded_linear f'' by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
506 |
have "x islimpt s" unfolding islimpt_approachable proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
507 |
guess a using UNIV_witness[where 'a='a] .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
508 |
fix e::real assume "0<e" guess d using assms(3)[rule_format,OF`e>0`,of a] .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
509 |
thus "\<exists>x'\<in>s. x' \<noteq> x \<and> dist x' x < e" apply(rule_tac x="x + d*\<^sub>R basis a" in bexI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
510 |
using basis_nonzero[of a] norm_basis[of a] unfolding vector_dist_norm by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
511 |
hence *:"netlimit (at x within s) = x" apply-apply(rule netlimit_within) unfolding trivial_limit_within by simp |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
512 |
show ?thesis apply(rule linear_eq_stdbasis) unfolding linear_conv_bounded_linear |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
513 |
apply(rule as(1,2)[THEN conjunct1])+ proof(rule,rule ccontr) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
514 |
fix i::'a def e \<equiv> "norm (f' (basis i) - f'' (basis i))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
515 |
assume "f' (basis i) \<noteq> f'' (basis i)" hence "e>0" unfolding e_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
516 |
guess d using Lim_sub[OF as(1,2)[THEN conjunct2], unfolded * Lim_within,rule_format,OF `e>0`] .. note d=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
517 |
guess c using assms(3)[rule_format,OF d[THEN conjunct1],of i] .. note c=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
518 |
have *:"norm (- ((1 / \<bar>c\<bar>) *\<^sub>R f' (c *\<^sub>R basis i)) + (1 / \<bar>c\<bar>) *\<^sub>R f'' (c *\<^sub>R basis i)) = norm ((1 / abs c) *\<^sub>R (- (f' (c *\<^sub>R basis i)) + f'' (c *\<^sub>R basis i)))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
519 |
unfolding scaleR_right_distrib by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
520 |
also have "\<dots> = norm ((1 / abs c) *\<^sub>R (c *\<^sub>R (- (f' (basis i)) + f'' (basis i))))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
521 |
unfolding f'.scaleR f''.scaleR unfolding scaleR_right_distrib scaleR_minus_right by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
522 |
also have "\<dots> = e" unfolding e_def norm_mul using c[THEN conjunct1] using norm_minus_cancel[of "f' (basis i) - f'' (basis i)"] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
523 |
finally show False using c using d[THEN conjunct2,rule_format,of "x + c *\<^sub>R basis i"] using norm_basis[of i] unfolding vector_dist_norm |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
524 |
unfolding f'.scaleR f''.scaleR f'.add f''.add f'.diff f''.diff scaleR_scaleR scaleR_right_diff_distrib scaleR_right_distrib by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
525 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
526 |
lemma frechet_derivative_unique_at: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
527 |
shows "(f has_derivative f') (at x) \<Longrightarrow> (f has_derivative f'') (at x) \<Longrightarrow> f' = f''" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
528 |
apply(rule frechet_derivative_unique_within[of f f' x UNIV f'']) unfolding within_UNIV apply(assumption)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
529 |
apply(rule,rule,rule) apply(rule_tac x="e/2" in exI) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
530 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
531 |
lemma "isCont f x = continuous (at x) f" unfolding isCont_def LIM_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
532 |
unfolding continuous_at Lim_at unfolding dist_nz by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
533 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
534 |
lemma frechet_derivative_unique_within_closed_interval: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
535 |
assumes "\<forall>i. a$i < b$i" "x \<in> {a..b}" (is "x\<in>?I") and
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
536 |
"(f has_derivative f' ) (at x within {a..b})" and
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
537 |
"(f has_derivative f'') (at x within {a..b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
538 |
shows "f' = f''" apply(rule frechet_derivative_unique_within) apply(rule assms(3,4))+ proof(rule,rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
539 |
fix e::real and i::'a assume "e>0" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
540 |
thus "\<exists>d. 0 < \<bar>d\<bar> \<and> \<bar>d\<bar> < e \<and> x + d *\<^sub>R basis i \<in> {a..b}" proof(cases "x$i=a$i")
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
541 |
case True thus ?thesis apply(rule_tac x="(min (b$i - a$i) e) / 2" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
542 |
using assms(1)[THEN spec[where x=i]] and `e>0` and assms(2) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
543 |
unfolding mem_interval by(auto simp add:field_simps) next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
544 |
note * = assms(2)[unfolded mem_interval,THEN spec[where x=i]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
545 |
case False moreover have "a $ i < x $ i" using False * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
546 |
moreover { have "a $ i * 2 + min (x $ i - a $ i) e \<le> a$i *2 + x$i - a$i" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
547 |
also have "\<dots> = a$i + x$i" by auto also have "\<dots> \<le> 2 * x$i" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
548 |
finally have "a $ i * 2 + min (x $ i - a $ i) e \<le> x $ i * 2" by auto } |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
549 |
moreover have "min (x $ i - a $ i) e \<ge> 0" using * and `e>0` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
550 |
hence "x $ i * 2 \<le> b $ i * 2 + min (x $ i - a $ i) e" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
551 |
ultimately show ?thesis apply(rule_tac x="- (min (x$i - a$i) e) / 2" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
552 |
using assms(1)[THEN spec[where x=i]] and `e>0` and assms(2) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
553 |
unfolding mem_interval by(auto simp add:field_simps) qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
554 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
555 |
lemma frechet_derivative_unique_within_open_interval: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
556 |
assumes "x \<in> {a<..<b}" "(f has_derivative f' ) (at x within {a<..<b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
557 |
"(f has_derivative f'') (at x within {a<..<b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
558 |
shows "f' = f''" apply(rule frechet_derivative_unique_within) apply(rule assms(2-3))+ proof(rule,rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
559 |
fix e::real and i::'a assume "e>0" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
560 |
note * = assms(1)[unfolded mem_interval,THEN spec[where x=i]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
561 |
have "a $ i < x $ i" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
562 |
moreover { have "a $ i * 2 + min (x $ i - a $ i) e \<le> a$i *2 + x$i - a$i" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
563 |
also have "\<dots> = a$i + x$i" by auto also have "\<dots> < 2 * x$i" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
564 |
finally have "a $ i * 2 + min (x $ i - a $ i) e < x $ i * 2" by auto } |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
565 |
moreover have "min (x $ i - a $ i) e \<ge> 0" using * and `e>0` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
566 |
hence "x $ i * 2 < b $ i * 2 + min (x $ i - a $ i) e" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
567 |
ultimately show "\<exists>d. 0 < \<bar>d\<bar> \<and> \<bar>d\<bar> < e \<and> x + d *\<^sub>R basis i \<in> {a<..<b}"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
568 |
apply(rule_tac x="- (min (x$i - a$i) e) / 2" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
569 |
using `e>0` and assms(1) unfolding mem_interval by(auto simp add:field_simps) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
570 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
571 |
lemma frechet_derivative_at: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
572 |
shows "(f has_derivative f') (at x) \<Longrightarrow> (f' = frechet_derivative f (at x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
573 |
apply(rule frechet_derivative_unique_at[of f],assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
574 |
unfolding frechet_derivative_works[THEN sym] using differentiable_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
575 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
576 |
lemma frechet_derivative_within_closed_interval: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
577 |
assumes "\<forall>i. a$i < b$i" "x \<in> {a..b}" "(f has_derivative f') (at x within {a.. b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
578 |
shows "frechet_derivative f (at x within {a.. b}) = f'"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
579 |
apply(rule frechet_derivative_unique_within_closed_interval[where f=f]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
580 |
apply(rule assms(1,2))+ unfolding frechet_derivative_works[THEN sym] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
581 |
unfolding differentiable_def using assms(3) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
582 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
583 |
subsection {* Component of the differential must be zero if it exists at a local *)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
584 |
(* maximum or minimum for that corresponding component. *} |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
585 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
586 |
lemma differential_zero_maxmin_component: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
587 |
assumes "0 < e" "((\<forall>y \<in> ball x e. (f y)$k \<le> (f x)$k) \<or> (\<forall>y\<in>ball x e. (f x)$k \<le> (f y)$k))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
588 |
"f differentiable (at x)" shows "jacobian f (at x) $ k = 0" proof(rule ccontr) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
589 |
def D \<equiv> "jacobian f (at x)" assume "jacobian f (at x) $ k \<noteq> 0" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
590 |
then obtain j where j:"D$k$j \<noteq> 0" unfolding Cart_eq D_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
591 |
hence *:"abs (jacobian f (at x) $ k $ j) / 2 > 0" unfolding D_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
592 |
note as = assms(3)[unfolded jacobian_works has_derivative_at_alt] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
593 |
guess e' using as[THEN conjunct2,rule_format,OF *] .. note e' = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
594 |
guess d using real_lbound_gt_zero[OF assms(1) e'[THEN conjunct1]] .. note d = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
595 |
{ fix c assume "abs c \<le> d"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
596 |
hence *:"norm (x + c *\<^sub>R basis j - x) < e'" using norm_basis[of j] d by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
597 |
have "\<bar>(f (x + c *\<^sub>R basis j) - f x - D *v (c *\<^sub>R basis j)) $ k\<bar> \<le> norm (f (x + c *\<^sub>R basis j) - f x - D *v (c *\<^sub>R basis j))" by(rule component_le_norm) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
598 |
also have "\<dots> \<le> \<bar>D $ k $ j\<bar> / 2 * \<bar>c\<bar>" using e'[THEN conjunct2,rule_format,OF *] and norm_basis[of j] unfolding D_def[symmetric] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
599 |
finally have "\<bar>(f (x + c *\<^sub>R basis j) - f x - D *v (c *\<^sub>R basis j)) $ k\<bar> \<le> \<bar>D $ k $ j\<bar> / 2 * \<bar>c\<bar>" by simp |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
600 |
hence "\<bar>f (x + c *\<^sub>R basis j) $ k - f x $ k - c * D $ k $ j\<bar> \<le> \<bar>D $ k $ j\<bar> / 2 * \<bar>c\<bar>" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
601 |
unfolding vector_component_simps matrix_vector_mul_component unfolding smult_conv_scaleR[symmetric] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
602 |
unfolding dot_rmult dot_basis unfolding smult_conv_scaleR by simp } note * = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
603 |
have "x + d *\<^sub>R basis j \<in> ball x e" "x - d *\<^sub>R basis j \<in> ball x e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
604 |
unfolding mem_ball vector_dist_norm using norm_basis[of j] d by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
605 |
hence **:"((f (x - d *\<^sub>R basis j))$k \<le> (f x)$k \<and> (f (x + d *\<^sub>R basis j))$k \<le> (f x)$k) \<or> |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
606 |
((f (x - d *\<^sub>R basis j))$k \<ge> (f x)$k \<and> (f (x + d *\<^sub>R basis j))$k \<ge> (f x)$k)" using assms(2) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
607 |
have ***:"\<And>y y1 y2 d dx::real. (y1\<le>y\<and>y2\<le>y) \<or> (y\<le>y1\<and>y\<le>y2) \<Longrightarrow> d < abs dx \<Longrightarrow> abs(y1 - y - - dx) \<le> d \<Longrightarrow> (abs (y2 - y - dx) \<le> d) \<Longrightarrow> False" by arith |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
608 |
show False apply(rule ***[OF **, where dx="d * D $ k $ j" and d="\<bar>D $ k $ j\<bar> / 2 * \<bar>d\<bar>"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
609 |
using *[of "-d"] and *[of d] and d[THEN conjunct1] and j unfolding mult_minus_left |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
610 |
unfolding abs_mult diff_minus_eq_add scaleR.minus_left unfolding group_simps by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
611 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
612 |
subsection {* In particular if we have a mapping into R^1. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
613 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
614 |
lemma differential_zero_maxmin: fixes f::"real^'a::finite \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
615 |
assumes "x \<in> s" "open s" "(f has_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
616 |
"(\<forall>y\<in>s. f y \<le> f x) \<or> (\<forall>y\<in>s. f x \<le> f y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
617 |
shows "f' = (\<lambda>v. 0)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
618 |
note deriv = assms(3)[unfolded has_derivative_at_vec1] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
619 |
obtain e where e:"e>0" "ball x e \<subseteq> s" using assms(2)[unfolded open_contains_ball] and assms(1) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
620 |
hence **:"(jacobian (vec1 \<circ> f) (at x)) $ 1 = 0" using differential_zero_maxmin_component[of e x "\<lambda>x. vec1 (f x)" 1] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
621 |
unfolding dest_vec1_def[THEN sym] vec1_dest_vec1 using assms(4) and assms(3)[unfolded has_derivative_at_vec1 o_def] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
622 |
unfolding differentiable_def o_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
623 |
have *:"jacobian (vec1 \<circ> f) (at x) = matrix (vec1 \<circ> f')" unfolding jacobian_def and frechet_derivative_at[OF deriv] .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
624 |
have "vec1 \<circ> f' = (\<lambda>x. 0)" apply(rule) unfolding matrix_works[OF derivative_is_linear[OF deriv],THEN sym] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
625 |
unfolding Cart_eq matrix_vector_mul_component using **[unfolded *] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
626 |
thus ?thesis apply-apply(rule,subst vec1_eq[THEN sym]) unfolding o_def apply(drule fun_cong) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
627 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
628 |
subsection {* The traditional Rolle theorem in one dimension. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
629 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
630 |
lemma vec1_le[simp]:fixes a::real shows "vec1 a \<le> vec1 b \<longleftrightarrow> a \<le> b" |
|
33758
53078b0d21f5
Renamed vector_less_eq_def to the more usual name vector_le_def.
hoelzl
parents:
33741
diff
changeset
|
631 |
unfolding vector_le_def by auto |
|
33741
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
632 |
lemma vec1_less[simp]:fixes a::real shows "vec1 a < vec1 b \<longleftrightarrow> a < b" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
633 |
unfolding vector_less_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
634 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
635 |
lemma rolle: fixes f::"real\<Rightarrow>real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
636 |
assumes "a < b" "f a = f b" "continuous_on {a..b} f"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
637 |
"\<forall>x\<in>{a<..<b}. (f has_derivative f'(x)) (at x)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
638 |
shows "\<exists>x\<in>{a<..<b}. f' x = (\<lambda>v. 0)" proof-
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
639 |
have "\<exists>x\<in>{a<..<b}. ((\<forall>y\<in>{a<..<b}. f x \<le> f y) \<or> (\<forall>y\<in>{a<..<b}. f y \<le> f x))" proof-
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
640 |
have "(a + b) / 2 \<in> {a .. b}" using assms(1) by auto hence *:"{a .. b}\<noteq>{}" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
641 |
guess d using continuous_attains_sup[OF compact_real_interval * assms(3)] .. note d=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
642 |
guess c using continuous_attains_inf[OF compact_real_interval * assms(3)] .. note c=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
643 |
show ?thesis proof(cases "d\<in>{a<..<b} \<or> c\<in>{a<..<b}")
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
644 |
case True thus ?thesis apply(erule_tac disjE) apply(rule_tac x=d in bexI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
645 |
apply(rule_tac[3] x=c in bexI) using d c by auto next def e \<equiv> "(a + b) /2" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
646 |
case False hence "f d = f c" using d c assms(2) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
647 |
hence "\<And>x. x\<in>{a..b} \<Longrightarrow> f x = f d" using c d apply- apply(erule_tac x=x in ballE)+ by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
648 |
thus ?thesis apply(rule_tac x=e in bexI) unfolding e_def using assms(1) by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
649 |
then guess x .. note x=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
650 |
hence "f' x \<circ> dest_vec1 = (\<lambda>v. 0)" apply(rule_tac differential_zero_maxmin[of "vec1 x" "vec1 ` {a<..<b}" "f \<circ> dest_vec1" "(f' x) \<circ> dest_vec1"])
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
651 |
unfolding vec1_interval defer apply(rule open_interval) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
652 |
apply(rule assms(4)[unfolded has_derivative_at_dest_vec1[THEN sym],THEN bspec[where x=x]],assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
653 |
unfolding o_def apply(erule disjE,rule disjI2) by(auto simp add: vector_less_def dest_vec1_def) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
654 |
thus ?thesis apply(rule_tac x=x in bexI) unfolding o_def apply rule |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
655 |
apply(drule_tac x="vec1 v" in fun_cong) unfolding vec1_dest_vec1 using x(1) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
656 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
657 |
subsection {* One-dimensional mean value theorem. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
658 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
659 |
lemma mvt: fixes f::"real \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
660 |
assumes "a < b" "continuous_on {a .. b} f" "\<forall>x\<in>{a<..<b}. (f has_derivative (f' x)) (at x)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
661 |
shows "\<exists>x\<in>{a<..<b}. (f b - f a = (f' x) (b - a))" proof-
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
662 |
have "\<exists>x\<in>{a<..<b}. (\<lambda>xa. f' x xa - (f b - f a) / (b - a) * xa) = (\<lambda>v. 0)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
663 |
apply(rule rolle[OF assms(1), of "\<lambda>x. f x - (f b - f a) / (b - a) * x"]) defer |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
664 |
apply(rule continuous_on_intros assms(2) continuous_on_cmul[where 'b=real, unfolded real_scaleR_def])+ proof |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
665 |
fix x assume x:"x \<in> {a<..<b}"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
666 |
show "((\<lambda>x. f x - (f b - f a) / (b - a) * x) has_derivative (\<lambda>xa. f' x xa - (f b - f a) / (b - a) * xa)) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
667 |
by(rule has_derivative_intros assms(3)[rule_format,OF x] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
668 |
has_derivative_cmul[where 'b=real, unfolded real_scaleR_def])+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
669 |
qed(insert assms(1), auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
670 |
then guess x .. thus ?thesis apply(rule_tac x=x in bexI) apply(drule fun_cong[of _ _ "b - a"]) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
671 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
672 |
lemma mvt_simple: fixes f::"real \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
673 |
assumes "a<b" "\<forall>x\<in>{a..b}. (f has_derivative f' x) (at x within {a..b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
674 |
shows "\<exists>x\<in>{a<..<b}. f b - f a = f' x (b - a)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
675 |
apply(rule mvt) apply(rule assms(1), rule differentiable_imp_continuous_on) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
676 |
unfolding differentiable_on_def differentiable_def defer proof |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
677 |
fix x assume x:"x \<in> {a<..<b}" show "(f has_derivative f' x) (at x)" unfolding has_derivative_within_open[OF x open_interval_real,THEN sym]
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
678 |
apply(rule has_derivative_within_subset) apply(rule assms(2)[rule_format]) using x by auto qed(insert assms(2), auto) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
679 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
680 |
lemma mvt_very_simple: fixes f::"real \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
681 |
assumes "a \<le> b" "\<forall>x\<in>{a..b}. (f has_derivative f'(x)) (at x within {a..b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
682 |
shows "\<exists>x\<in>{a..b}. f b - f a = f' x (b - a)" proof(cases "a = b")
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
683 |
interpret bounded_linear "f' b" using assms(2) assms(1) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
684 |
case True thus ?thesis apply(rule_tac x=a in bexI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
685 |
using assms(2)[THEN bspec[where x=a]] unfolding has_derivative_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
686 |
unfolding True using zero by auto next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
687 |
case False thus ?thesis using mvt_simple[OF _ assms(2)] using assms(1) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
688 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
689 |
subsection {* A nice generalization (see Havin's proof of 5.19 from Rudin's book). *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
690 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
691 |
lemma inner_eq_dot: fixes a::"real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
692 |
shows "a \<bullet> b = inner a b" unfolding inner_vector_def dot_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
693 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
694 |
lemma mvt_general: fixes f::"real\<Rightarrow>real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
695 |
assumes "a<b" "continuous_on {a..b} f" "\<forall>x\<in>{a<..<b}. (f has_derivative f'(x)) (at x)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
696 |
shows "\<exists>x\<in>{a<..<b}. norm(f b - f a) \<le> norm(f'(x) (b - a))" proof-
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
697 |
have "\<exists>x\<in>{a<..<b}. (op \<bullet> (f b - f a) \<circ> f) b - (op \<bullet> (f b - f a) \<circ> f) a = (f b - f a) \<bullet> f' x (b - a)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
698 |
apply(rule mvt) apply(rule assms(1))unfolding inner_eq_dot apply(rule continuous_on_inner continuous_on_intros assms(2))+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
699 |
unfolding o_def apply(rule,rule has_derivative_lift_dot) using assms(3) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
700 |
then guess x .. note x=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
701 |
show ?thesis proof(cases "f a = f b") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
702 |
case False have "norm (f b - f a) * norm (f b - f a) = norm (f b - f a)^2" by(simp add:class_semiring.semiring_rules) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
703 |
also have "\<dots> = (f b - f a) \<bullet> (f b - f a)" unfolding norm_pow_2 .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
704 |
also have "\<dots> = (f b - f a) \<bullet> f' x (b - a)" using x by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
705 |
also have "\<dots> \<le> norm (f b - f a) * norm (f' x (b - a))" by(rule norm_cauchy_schwarz) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
706 |
finally show ?thesis using False x(1) by(auto simp add: real_mult_left_cancel) next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
707 |
case True thus ?thesis using assms(1) apply(rule_tac x="(a + b) /2" in bexI) by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
708 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
709 |
subsection {* Still more general bound theorem. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
710 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
711 |
lemma differentiable_bound: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
712 |
assumes "convex s" "\<forall>x\<in>s. (f has_derivative f'(x)) (at x within s)" "\<forall>x\<in>s. onorm(f' x) \<le> B" and x:"x\<in>s" and y:"y\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
713 |
shows "norm(f x - f y) \<le> B * norm(x - y)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
714 |
let ?p = "\<lambda>u. x + u *\<^sub>R (y - x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
715 |
have *:"\<And>u. u\<in>{0..1} \<Longrightarrow> x + u *\<^sub>R (y - x) \<in> s"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
716 |
using assms(1)[unfolded convex_alt,rule_format,OF x y] unfolding scaleR_left_diff_distrib scaleR_right_diff_distrib by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
717 |
hence 1:"continuous_on {0..1} (f \<circ> ?p)" apply- apply(rule continuous_on_intros continuous_on_vmul)+
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
718 |
unfolding continuous_on_eq_continuous_within apply(rule,rule differentiable_imp_continuous_within) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
719 |
unfolding differentiable_def apply(rule_tac x="f' xa" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
720 |
apply(rule has_derivative_within_subset) apply(rule assms(2)[rule_format]) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
721 |
have 2:"\<forall>u\<in>{0<..<1}. ((f \<circ> ?p) has_derivative f' (x + u *\<^sub>R (y - x)) \<circ> (\<lambda>u. 0 + u *\<^sub>R (y - x))) (at u)" proof rule case goal1
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
722 |
let ?u = "x + u *\<^sub>R (y - x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
723 |
have "(f \<circ> ?p has_derivative (f' ?u) \<circ> (\<lambda>u. 0 + u *\<^sub>R (y - x))) (at u within {0<..<1})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
724 |
apply(rule diff_chain_within) apply(rule has_derivative_intros)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
725 |
apply(rule has_derivative_within_subset) apply(rule assms(2)[rule_format]) using goal1 * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
726 |
thus ?case unfolding has_derivative_within_open[OF goal1 open_interval_real] by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
727 |
guess u using mvt_general[OF zero_less_one 1 2] .. note u = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
728 |
have **:"\<And>x y. x\<in>s \<Longrightarrow> norm (f' x y) \<le> B * norm y" proof- case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
729 |
have "norm (f' x y) \<le> onorm (f' x) * norm y" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
730 |
using onorm(1)[OF derivative_is_linear[OF assms(2)[rule_format,OF goal1]]] by assumption |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
731 |
also have "\<dots> \<le> B * norm y" apply(rule mult_right_mono) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
732 |
using assms(3)[rule_format,OF goal1] by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
733 |
finally show ?case by simp qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
734 |
have "norm (f x - f y) = norm ((f \<circ> (\<lambda>u. x + u *\<^sub>R (y - x))) 1 - (f \<circ> (\<lambda>u. x + u *\<^sub>R (y - x))) 0)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
735 |
by(auto simp add:norm_minus_commute) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
736 |
also have "\<dots> \<le> norm (f' (x + u *\<^sub>R (y - x)) (y - x))" using u by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
737 |
also have "\<dots> \<le> B * norm(y - x)" apply(rule **) using * and u by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
738 |
finally show ?thesis by(auto simp add:norm_minus_commute) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
739 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
740 |
lemma onorm_vec1: fixes f::"real \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
741 |
shows "onorm (\<lambda>x. vec1 (f (dest_vec1 x))) = onorm f" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
742 |
have "\<forall>x::real^1. norm x = 1 \<longleftrightarrow> x\<in>{vec1 -1, vec1 (1::real)}" unfolding forall_vec1 unfolding norm_vec1 by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
743 |
hence 1:"{x. norm x = 1} = {vec1 -1, vec1 (1::real)}" by(auto simp add:norm_vec1)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
744 |
have 2:"{norm (vec1 (f (dest_vec1 x))) |x. norm x = 1} = (\<lambda>x. norm (vec1 (f (dest_vec1 x)))) ` {x. norm x=1}" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
745 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
746 |
have "\<forall>x::real. norm x = 1 \<longleftrightarrow> x\<in>{-1, 1}" by auto hence 3:"{x. norm x = 1} = {-1, (1::real)}" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
747 |
have 4:"{norm (f x) |x. norm x = 1} = (\<lambda>x. norm (f x)) ` {x. norm x=1}" by auto
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
748 |
show ?thesis unfolding onorm_def 1 2 3 4 by(simp add:Sup_finite_Max norm_vec1) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
749 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
750 |
lemma differentiable_bound_real: fixes f::"real \<Rightarrow> real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
751 |
assumes "convex s" "\<forall>x\<in>s. (f has_derivative f' x) (at x within s)" "\<forall>x\<in>s. onorm(f' x) \<le> B" and x:"x\<in>s" and y:"y\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
752 |
shows "norm(f x - f y) \<le> B * norm(x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
753 |
using differentiable_bound[of "vec1 ` s" "vec1 \<circ> f \<circ> dest_vec1" "\<lambda>x. vec1 \<circ> (f' (dest_vec1 x)) \<circ> dest_vec1" B "vec1 x" "vec1 y"] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
754 |
unfolding Ball_def forall_vec1 unfolding has_derivative_within_vec1_dest_vec1 image_iff |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
755 |
unfolding convex_vec1 unfolding o_def vec1_dest_vec1_simps onorm_vec1 using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
756 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
757 |
subsection {* In particular. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
758 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
759 |
lemma has_derivative_zero_constant: fixes f::"real\<Rightarrow>real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
760 |
assumes "convex s" "\<forall>x\<in>s. (f has_derivative (\<lambda>h. 0)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
761 |
shows "\<exists>c. \<forall>x\<in>s. f x = c" proof(cases "s={}")
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
762 |
case False then obtain x where "x\<in>s" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
763 |
have "\<And>y. y\<in>s \<Longrightarrow> f x = f y" proof- case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
764 |
thus ?case using differentiable_bound_real[OF assms(1-2), of 0 x y] and `x\<in>s` |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
765 |
unfolding onorm_vec1[of "\<lambda>x. 0", THEN sym] onorm_const norm_vec1 by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
766 |
thus ?thesis apply(rule_tac x="f x" in exI) by auto qed auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
767 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
768 |
lemma has_derivative_zero_unique: fixes f::"real\<Rightarrow>real" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
769 |
assumes "convex s" "a \<in> s" "f a = c" "\<forall>x\<in>s. (f has_derivative (\<lambda>h. 0)) (at x within s)" "x\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
770 |
shows "f x = c" using has_derivative_zero_constant[OF assms(1,4)] using assms(2-3,5) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
771 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
772 |
subsection {* Differentiability of inverse function (most basic form). *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
773 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
774 |
lemma has_derivative_inverse_basic: fixes f::"real^'b::finite \<Rightarrow> real^'c::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
775 |
assumes "(f has_derivative f') (at (g y))" "bounded_linear g'" "g' \<circ> f' = id" "continuous (at y) g" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
776 |
"open t" "y \<in> t" "\<forall>z\<in>t. f(g z) = z" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
777 |
shows "(g has_derivative g') (at y)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
778 |
interpret f': bounded_linear f' using assms unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
779 |
interpret g': bounded_linear g' using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
780 |
guess C using bounded_linear.pos_bounded[OF assms(2)] .. note C = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
781 |
(* have fgid:"\<And>x. g' (f' x) = x" using assms(3) unfolding o_def id_def apply()*) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
782 |
have lem1:"\<forall>e>0. \<exists>d>0. \<forall>z. norm(z - y) < d \<longrightarrow> norm(g z - g y - g'(z - y)) \<le> e * norm(g z - g y)" proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
783 |
have *:"e / C > 0" apply(rule divide_pos_pos) using `e>0` C by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
784 |
guess d0 using assms(1)[unfolded has_derivative_at_alt,THEN conjunct2,rule_format,OF *] .. note d0=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
785 |
guess d1 using assms(4)[unfolded continuous_at Lim_at,rule_format,OF d0[THEN conjunct1]] .. note d1=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
786 |
guess d2 using assms(5)[unfolded open_dist,rule_format,OF assms(6)] .. note d2=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
787 |
guess d using real_lbound_gt_zero[OF d1[THEN conjunct1] d2[THEN conjunct1]] .. note d=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
788 |
thus ?case apply(rule_tac x=d in exI) apply rule defer proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
789 |
fix z assume as:"norm (z - y) < d" hence "z\<in>t" using d2 d unfolding vector_dist_norm by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
790 |
have "norm (g z - g y - g' (z - y)) \<le> norm (g' (f (g z) - y - f' (g z - g y)))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
791 |
unfolding g'.diff f'.diff unfolding assms(3)[unfolded o_def id_def, THEN fun_cong] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
792 |
unfolding assms(7)[rule_format,OF `z\<in>t`] apply(subst norm_minus_cancel[THEN sym]) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
793 |
also have "\<dots> \<le> norm(f (g z) - y - f' (g z - g y)) * C" by(rule C[THEN conjunct2,rule_format]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
794 |
also have "\<dots> \<le> (e / C) * norm (g z - g y) * C" apply(rule mult_right_mono) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
795 |
apply(rule d0[THEN conjunct2,rule_format,unfolded assms(7)[rule_format,OF `y\<in>t`]]) apply(cases "z=y") defer |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
796 |
apply(rule d1[THEN conjunct2, unfolded vector_dist_norm,rule_format]) using as d C d0 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
797 |
also have "\<dots> \<le> e * norm (g z - g y)" using C by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
798 |
finally show "norm (g z - g y - g' (z - y)) \<le> e * norm (g z - g y)" by simp qed auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
799 |
have *:"(0::real) < 1 / 2" by auto guess d using lem1[rule_format,OF *] .. note d=this def B\<equiv>"C*2" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
800 |
have "B>0" unfolding B_def using C by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
801 |
have lem2:"\<forall>z. norm(z - y) < d \<longrightarrow> norm(g z - g y) \<le> B * norm(z - y)" proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
802 |
have "norm (g z - g y) \<le> norm(g' (z - y)) + norm ((g z - g y) - g'(z - y))" by(rule norm_triangle_sub) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
803 |
also have "\<dots> \<le> norm(g' (z - y)) + 1 / 2 * norm (g z - g y)" apply(rule add_left_mono) using d and goal1 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
804 |
also have "\<dots> \<le> norm (z - y) * C + 1 / 2 * norm (g z - g y)" apply(rule add_right_mono) using C by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
805 |
finally show ?case unfolding B_def by(auto simp add:field_simps) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
806 |
show ?thesis unfolding has_derivative_at_alt proof(rule,rule assms,rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
807 |
hence *:"e/B >0" apply-apply(rule divide_pos_pos) using `B>0` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
808 |
guess d' using lem1[rule_format,OF *] .. note d'=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
809 |
guess k using real_lbound_gt_zero[OF d[THEN conjunct1] d'[THEN conjunct1]] .. note k=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
810 |
show ?case apply(rule_tac x=k in exI,rule) defer proof(rule,rule) fix z assume as:"norm(z - y) < k" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
811 |
hence "norm (g z - g y - g' (z - y)) \<le> e / B * norm(g z - g y)" using d' k by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
812 |
also have "\<dots> \<le> e * norm(z - y)" unfolding mult_frac_num pos_divide_le_eq[OF `B>0`] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
813 |
using lem2[THEN spec[where x=z]] using k as using `e>0` by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
814 |
finally show "norm (g z - g y - g' (z - y)) \<le> e * norm (z - y)" by simp qed(insert k, auto) qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
815 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
816 |
subsection {* Simply rewrite that based on the domain point x. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
817 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
818 |
lemma has_derivative_inverse_basic_x: fixes f::"real^'b::finite \<Rightarrow> real^'c::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
819 |
assumes "(f has_derivative f') (at x)" "bounded_linear g'" "g' o f' = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
820 |
"continuous (at (f x)) g" "g(f x) = x" "open t" "f x \<in> t" "\<forall>y\<in>t. f(g y) = y" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
821 |
shows "(g has_derivative g') (at (f(x)))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
822 |
apply(rule has_derivative_inverse_basic) using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
823 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
824 |
subsection {* This is the version in Dieudonne', assuming continuity of f and g. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
825 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
826 |
lemma has_derivative_inverse_dieudonne: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
827 |
assumes "open s" "open (f ` s)" "continuous_on s f" "continuous_on (f ` s) g" "\<forall>x\<in>s. g(f x) = x" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
828 |
(**) "x\<in>s" "(f has_derivative f') (at x)" "bounded_linear g'" "g' o f' = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
829 |
shows "(g has_derivative g') (at (f x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
830 |
apply(rule has_derivative_inverse_basic_x[OF assms(7-9) _ _ assms(2)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
831 |
using assms(3-6) unfolding continuous_on_eq_continuous_at[OF assms(1)] continuous_on_eq_continuous_at[OF assms(2)] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
832 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
833 |
subsection {* Here's the simplest way of not assuming much about g. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
834 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
835 |
lemma has_derivative_inverse: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
836 |
assumes "compact s" "x \<in> s" "f x \<in> interior(f ` s)" "continuous_on s f" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
837 |
"\<forall>y\<in>s. g(f y) = y" "(f has_derivative f') (at x)" "bounded_linear g'" "g' \<circ> f' = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
838 |
shows "(g has_derivative g') (at (f x))" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
839 |
{ fix y assume "y\<in>interior (f ` s)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
840 |
then obtain x where "x\<in>s" and *:"y = f x" unfolding image_iff using interior_subset by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
841 |
have "f (g y) = y" unfolding * and assms(5)[rule_format,OF `x\<in>s`] .. } note * = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
842 |
show ?thesis apply(rule has_derivative_inverse_basic_x[OF assms(6-8)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
843 |
apply(rule continuous_on_interior[OF _ assms(3)]) apply(rule continuous_on_inverse[OF assms(4,1)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
844 |
apply(rule assms(2,5) assms(5)[rule_format] open_interior assms(3))+ by(rule, rule *, assumption) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
845 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
846 |
subsection {* Proving surjectivity via Brouwer fixpoint theorem. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
847 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
848 |
lemma brouwer_surjective: fixes f::"real^'n::finite \<Rightarrow> real^'n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
849 |
assumes "compact t" "convex t" "t \<noteq> {}" "continuous_on t f"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
850 |
"\<forall>x\<in>s. \<forall>y\<in>t. x + (y - f y) \<in> t" "x\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
851 |
shows "\<exists>y\<in>t. f y = x" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
852 |
have *:"\<And>x y. f y = x \<longleftrightarrow> x + (y - f y) = y" by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
853 |
show ?thesis unfolding * apply(rule brouwer[OF assms(1-3), of "\<lambda>y. x + (y - f y)"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
854 |
apply(rule continuous_on_intros assms)+ using assms(4-6) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
855 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
856 |
lemma brouwer_surjective_cball: fixes f::"real^'n::finite \<Rightarrow> real^'n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
857 |
assumes "0 < e" "continuous_on (cball a e) f" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
858 |
"\<forall>x\<in>s. \<forall>y\<in>cball a e. x + (y - f y) \<in> cball a e" "x\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
859 |
shows "\<exists>y\<in>cball a e. f y = x" apply(rule brouwer_surjective) apply(rule compact_cball convex_cball)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
860 |
unfolding cball_eq_empty using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
861 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
862 |
text {* See Sussmann: "Multidifferential calculus", Theorem 2.1.1 *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
863 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
864 |
lemma sussmann_open_mapping: fixes f::"real^'a::finite \<Rightarrow> real^'b::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
865 |
assumes "open s" "continuous_on s f" "x \<in> s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
866 |
"(f has_derivative f') (at x)" "bounded_linear g'" "f' \<circ> g' = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
867 |
(**) "t \<subseteq> s" "x \<in> interior t" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
868 |
shows "f x \<in> interior (f ` t)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
869 |
interpret f':bounded_linear f' using assms unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
870 |
interpret g':bounded_linear g' using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
871 |
guess B using bounded_linear.pos_bounded[OF assms(5)] .. note B=this hence *:"1/(2*B)>0" by(auto intro!: divide_pos_pos) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
872 |
guess e0 using assms(4)[unfolded has_derivative_at_alt,THEN conjunct2,rule_format,OF *] .. note e0=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
873 |
guess e1 using assms(8)[unfolded mem_interior_cball] .. note e1=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
874 |
have *:"0<e0/B" "0<e1/B" apply(rule_tac[!] divide_pos_pos) using e0 e1 B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
875 |
guess e using real_lbound_gt_zero[OF *] .. note e=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
876 |
have "\<forall>z\<in>cball (f x) (e/2). \<exists>y\<in>cball (f x) e. f (x + g' (y - f x)) = z" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
877 |
apply(rule,rule brouwer_surjective_cball[where s="cball (f x) (e/2)"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
878 |
prefer 3 apply(rule,rule) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
879 |
show "continuous_on (cball (f x) e) (\<lambda>y. f (x + g' (y - f x)))" unfolding g'.diff |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
880 |
apply(rule continuous_on_compose[of _ _ f, unfolded o_def]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
881 |
apply(rule continuous_on_intros linear_continuous_on[OF assms(5)])+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
882 |
apply(rule continuous_on_subset[OF assms(2)]) apply(rule,unfold image_iff,erule bexE) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
883 |
fix y z assume as:"y \<in>cball (f x) e" "z = x + (g' y - g' (f x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
884 |
have "dist x z = norm (g' (f x) - g' y)" unfolding as(2) and vector_dist_norm by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
885 |
also have "\<dots> \<le> norm (f x - y) * B" unfolding g'.diff[THEN sym] using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
886 |
also have "\<dots> \<le> e * B" using as(1)[unfolded mem_cball vector_dist_norm] using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
887 |
also have "\<dots> \<le> e1" using e unfolding less_divide_eq using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
888 |
finally have "z\<in>cball x e1" unfolding mem_cball by force |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
889 |
thus "z \<in> s" using e1 assms(7) by auto qed next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
890 |
fix y z assume as:"y \<in> cball (f x) (e / 2)" "z \<in> cball (f x) e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
891 |
have "norm (g' (z - f x)) \<le> norm (z - f x) * B" using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
892 |
also have "\<dots> \<le> e * B" apply(rule mult_right_mono) using as(2)[unfolded mem_cball vector_dist_norm] and B unfolding norm_minus_commute by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
893 |
also have "\<dots> < e0" using e and B unfolding less_divide_eq by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
894 |
finally have *:"norm (x + g' (z - f x) - x) < e0" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
895 |
have **:"f x + f' (x + g' (z - f x) - x) = z" using assms(6)[unfolded o_def id_def,THEN cong] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
896 |
have "norm (f x - (y + (z - f (x + g' (z - f x))))) \<le> norm (f (x + g' (z - f x)) - z) + norm (f x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
897 |
using norm_triangle_ineq[of "f (x + g'(z - f x)) - z" "f x - y"] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
898 |
also have "\<dots> \<le> 1 / (B * 2) * norm (g' (z - f x)) + norm (f x - y)" using e0[THEN conjunct2,rule_format,OF *] unfolding group_simps ** by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
899 |
also have "\<dots> \<le> 1 / (B * 2) * norm (g' (z - f x)) + e/2" using as(1)[unfolded mem_cball vector_dist_norm] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
900 |
also have "\<dots> \<le> 1 / (B * 2) * B * norm (z - f x) + e/2" using * and B by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
901 |
also have "\<dots> \<le> 1 / 2 * norm (z - f x) + e/2" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
902 |
also have "\<dots> \<le> e/2 + e/2" apply(rule add_right_mono) using as(2)[unfolded mem_cball vector_dist_norm] unfolding norm_minus_commute by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
903 |
finally show "y + (z - f (x + g' (z - f x))) \<in> cball (f x) e" unfolding mem_cball vector_dist_norm by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
904 |
qed(insert e, auto) note lem = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
905 |
show ?thesis unfolding mem_interior apply(rule_tac x="e/2" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
906 |
apply(rule,rule divide_pos_pos) prefer 3 proof |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
907 |
fix y assume "y \<in> ball (f x) (e/2)" hence *:"y\<in>cball (f x) (e/2)" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
908 |
guess z using lem[rule_format,OF *] .. note z=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
909 |
hence "norm (g' (z - f x)) \<le> norm (z - f x) * B" using B by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
910 |
also have "\<dots> \<le> e * B" apply(rule mult_right_mono) using z(1) unfolding mem_cball vector_dist_norm norm_minus_commute using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
911 |
also have "\<dots> \<le> e1" using e B unfolding less_divide_eq by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
912 |
finally have "x + g'(z - f x) \<in> t" apply- apply(rule e1[THEN conjunct2,unfolded subset_eq,rule_format]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
913 |
unfolding mem_cball vector_dist_norm by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
914 |
thus "y \<in> f ` t" using z by auto qed(insert e, auto) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
915 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
916 |
text {* Hence the following eccentric variant of the inverse function theorem. *)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
917 |
(* This has no continuity assumptions, but we do need the inverse function. *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
918 |
(* We could put f' o g = I but this happens to fit with the minimal linear *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
919 |
(* algebra theory I've set up so far. *} |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
920 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
921 |
lemma has_derivative_inverse_strong: fixes f::"real^'n::finite \<Rightarrow> real^'n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
922 |
assumes "open s" "x \<in> s" "continuous_on s f" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
923 |
"\<forall>x\<in>s. g(f x) = x" "(f has_derivative f') (at x)" "f' o g' = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
924 |
shows "(g has_derivative g') (at (f x))" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
925 |
have linf:"bounded_linear f'" using assms(5) unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
926 |
hence ling:"bounded_linear g'" unfolding linear_conv_bounded_linear[THEN sym] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
927 |
apply- apply(rule right_inverse_linear) using assms(6) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
928 |
moreover have "g' \<circ> f' = id" using assms(6) linf ling unfolding linear_conv_bounded_linear[THEN sym] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
929 |
using linear_inverse_left by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
930 |
moreover have *:"\<forall>t\<subseteq>s. x\<in>interior t \<longrightarrow> f x \<in> interior (f ` t)" apply(rule,rule,rule,rule sussmann_open_mapping ) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
931 |
apply(rule assms ling)+ by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
932 |
have "continuous (at (f x)) g" unfolding continuous_at Lim_at proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
933 |
fix e::real assume "e>0" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
934 |
hence "f x \<in> interior (f ` (ball x e \<inter> s))" using *[rule_format,of "ball x e \<inter> s"] `x\<in>s` |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
935 |
by(auto simp add: interior_open[OF open_ball] interior_open[OF assms(1)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
936 |
then guess d unfolding mem_interior .. note d=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
937 |
show "\<exists>d>0. \<forall>y. 0 < dist y (f x) \<and> dist y (f x) < d \<longrightarrow> dist (g y) (g (f x)) < e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
938 |
apply(rule_tac x=d in exI) apply(rule,rule d[THEN conjunct1]) proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
939 |
hence "g y \<in> g ` f ` (ball x e \<inter> s)" using d[THEN conjunct2,unfolded subset_eq,THEN bspec[where x=y]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
940 |
by(auto simp add:dist_commute) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
941 |
hence "g y \<in> ball x e \<inter> s" using assms(4) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
942 |
thus "dist (g y) (g (f x)) < e" using assms(4)[rule_format,OF `x\<in>s`] by(auto simp add:dist_commute) qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
943 |
moreover have "f x \<in> interior (f ` s)" apply(rule sussmann_open_mapping) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
944 |
apply(rule assms ling)+ using interior_open[OF assms(1)] and `x\<in>s` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
945 |
moreover have "\<And>y. y \<in> interior (f ` s) \<Longrightarrow> f (g y) = y" proof- case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
946 |
hence "y\<in>f ` s" using interior_subset by auto then guess z unfolding image_iff .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
947 |
thus ?case using assms(4) by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
948 |
ultimately show ?thesis apply- apply(rule has_derivative_inverse_basic_x[OF assms(5)]) using assms by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
949 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
950 |
subsection {* A rewrite based on the other domain. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
951 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
952 |
lemma has_derivative_inverse_strong_x: fixes f::"real^'n::finite \<Rightarrow> real^'n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
953 |
assumes "open s" "g y \<in> s" "continuous_on s f" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
954 |
"\<forall>x\<in>s. g(f x) = x" "(f has_derivative f') (at (g y))" "f' o g' = id" "f(g y) = y" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
955 |
shows "(g has_derivative g') (at y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
956 |
using has_derivative_inverse_strong[OF assms(1-6)] unfolding assms(7) by simp |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
957 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
958 |
subsection {* On a region. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
959 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
960 |
lemma has_derivative_inverse_on: fixes f::"real^'n::finite \<Rightarrow> real^'n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
961 |
assumes "open s" "\<forall>x\<in>s. (f has_derivative f'(x)) (at x)" "\<forall>x\<in>s. g(f x) = x" "f'(x) o g'(x) = id" "x\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
962 |
shows "(g has_derivative g'(x)) (at (f x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
963 |
apply(rule has_derivative_inverse_strong[where g'="g' x" and f=f]) apply(rule assms)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
964 |
unfolding continuous_on_eq_continuous_at[OF assms(1)] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
965 |
apply(rule,rule differentiable_imp_continuous_at) unfolding differentiable_def using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
966 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
967 |
subsection {* Invertible derivative continous at a point implies local injectivity. *)
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
968 |
(* It's only for this we need continuity of the derivative, except of course *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
969 |
(* if we want the fact that the inverse derivative is also continuous. So if *) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
970 |
(* we know for some other reason that the inverse function exists, it's OK. *} |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
971 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
972 |
lemma bounded_linear_sub: "bounded_linear f \<Longrightarrow> bounded_linear g ==> bounded_linear (\<lambda>x. f x - g x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
973 |
using bounded_linear_add[of f "\<lambda>x. - g x"] bounded_linear_minus[of g] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
974 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
975 |
lemma has_derivative_locally_injective: fixes f::"real^'n::finite \<Rightarrow> real^'m::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
976 |
assumes "a \<in> s" "open s" "bounded_linear g'" "g' o f'(a) = id" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
977 |
"\<forall>x\<in>s. (f has_derivative f'(x)) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
978 |
"\<forall>e>0. \<exists>d>0. \<forall>x. dist a x < d \<longrightarrow> onorm(\<lambda>v. f' x v - f' a v) < e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
979 |
obtains t where "a \<in> t" "open t" "\<forall>x\<in>t. \<forall>x'\<in>t. (f x' = f x) \<longrightarrow> (x' = x)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
980 |
interpret bounded_linear g' using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
981 |
note f'g' = assms(4)[unfolded id_def o_def,THEN cong] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
982 |
have "g' (f' a 1) = 1" using f'g' by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
983 |
hence *:"0 < onorm g'" unfolding onorm_pos_lt[OF assms(3)[unfolded linear_linear]] by fastsimp |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
984 |
def k \<equiv> "1 / onorm g' / 2" have *:"k>0" unfolding k_def using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
985 |
guess d1 using assms(6)[rule_format,OF *] .. note d1=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
986 |
from `open s` obtain d2 where "d2>0" "ball a d2 \<subseteq> s" using `a\<in>s` .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
987 |
obtain d2 where "d2>0" "ball a d2 \<subseteq> s" using assms(2,1) .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
988 |
guess d2 using assms(2)[unfolded open_contains_ball,rule_format,OF `a\<in>s`] .. note d2=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
989 |
guess d using real_lbound_gt_zero[OF d1[THEN conjunct1] d2[THEN conjunct1]] .. note d = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
990 |
show ?thesis proof show "a\<in>ball a d" using d by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
991 |
show "\<forall>x\<in>ball a d. \<forall>x'\<in>ball a d. f x' = f x \<longrightarrow> x' = x" proof(intro strip) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
992 |
fix x y assume as:"x\<in>ball a d" "y\<in>ball a d" "f x = f y" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
993 |
def ph \<equiv> "\<lambda>w. w - g'(f w - f x)" have ph':"ph = g' \<circ> (\<lambda>w. f' a w - (f w - f x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
994 |
unfolding ph_def o_def unfolding diff using f'g' by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
995 |
have "norm (ph x - ph y) \<le> (1/2) * norm (x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
996 |
apply(rule differentiable_bound[OF convex_ball _ _ as(1-2), where f'="\<lambda>x v. v - g'(f' x v)"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
997 |
apply(rule_tac[!] ballI) proof- fix u assume u:"u \<in> ball a d" hence "u\<in>s" using d d2 by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
998 |
have *:"(\<lambda>v. v - g' (f' u v)) = g' \<circ> (\<lambda>w. f' a w - f' u w)" unfolding o_def and diff using f'g' by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
999 |
show "(ph has_derivative (\<lambda>v. v - g' (f' u v))) (at u within ball a d)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1000 |
unfolding ph' * apply(rule diff_chain_within) defer apply(rule bounded_linear.has_derivative[OF assms(3)]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1001 |
apply(rule has_derivative_intros) defer apply(rule has_derivative_sub[where g'="\<lambda>x.0",unfolded diff_0_right]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1002 |
apply(rule has_derivative_at_within) using assms(5) and `u\<in>s` `a\<in>s` |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1003 |
by(auto intro!: has_derivative_intros derivative_linear) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1004 |
have **:"bounded_linear (\<lambda>x. f' u x - f' a x)" "bounded_linear (\<lambda>x. f' a x - f' u x)" apply(rule_tac[!] bounded_linear_sub) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1005 |
apply(rule_tac[!] derivative_linear) using assms(5) `u\<in>s` `a\<in>s` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1006 |
have "onorm (\<lambda>v. v - g' (f' u v)) \<le> onorm g' * onorm (\<lambda>w. f' a w - f' u w)" unfolding * apply(rule onorm_compose) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1007 |
unfolding linear_conv_bounded_linear by(rule assms(3) **)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1008 |
also have "\<dots> \<le> onorm g' * k" apply(rule mult_left_mono) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1009 |
using d1[THEN conjunct2,rule_format,of u] using onorm_neg[OF **(1)[unfolded linear_linear]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1010 |
using d and u and onorm_pos_le[OF assms(3)[unfolded linear_linear]] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1011 |
also have "\<dots> \<le> 1/2" unfolding k_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1012 |
finally show "onorm (\<lambda>v. v - g' (f' u v)) \<le> 1 / 2" by assumption qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1013 |
moreover have "norm (ph y - ph x) = norm (y - x)" apply(rule arg_cong[where f=norm]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1014 |
unfolding ph_def using diff unfolding as by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1015 |
ultimately show "x = y" unfolding norm_minus_commute by auto qed qed auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1016 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1017 |
subsection {* Uniformly convergent sequence of derivatives. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1018 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1019 |
lemma has_derivative_sequence_lipschitz_lemma: fixes f::"nat \<Rightarrow> real^'m::finite \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1020 |
assumes "convex s" "\<forall>n. \<forall>x\<in>s. ((f n) has_derivative (f' n x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1021 |
"\<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm(f' n x h - g' x h) \<le> e * norm(h)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1022 |
shows "\<forall>m\<ge>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>y\<in>s. norm((f m x - f n x) - (f m y - f n y)) \<le> 2 * e * norm(x - y)" proof(default)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1023 |
fix m n x y assume as:"N\<le>m" "N\<le>n" "x\<in>s" "y\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1024 |
show "norm((f m x - f n x) - (f m y - f n y)) \<le> 2 * e * norm(x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1025 |
apply(rule differentiable_bound[where f'="\<lambda>x h. f' m x h - f' n x h", OF assms(1) _ _ as(3-4)]) apply(rule_tac[!] ballI) proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1026 |
fix x assume "x\<in>s" show "((\<lambda>a. f m a - f n a) has_derivative (\<lambda>h. f' m x h - f' n x h)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1027 |
by(rule has_derivative_intros assms(2)[rule_format] `x\<in>s`)+ |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1028 |
{ fix h have "norm (f' m x h - f' n x h) \<le> norm (f' m x h - g' x h) + norm (f' n x h - g' x h)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1029 |
using norm_triangle_ineq[of "f' m x h - g' x h" "- f' n x h + g' x h"] unfolding norm_minus_commute by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1030 |
also have "\<dots> \<le> e * norm h+ e * norm h" using assms(3)[rule_format,OF `N\<le>m` `x\<in>s`, of h] assms(3)[rule_format,OF `N\<le>n` `x\<in>s`, of h] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1031 |
by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1032 |
finally have "norm (f' m x h - f' n x h) \<le> 2 * e * norm h" by auto } |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1033 |
thus "onorm (\<lambda>h. f' m x h - f' n x h) \<le> 2 * e" apply-apply(rule onorm(2)) apply(rule linear_compose_sub) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1034 |
unfolding linear_conv_bounded_linear using assms(2)[rule_format,OF `x\<in>s`, THEN derivative_linear] by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1035 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1036 |
lemma has_derivative_sequence_lipschitz: fixes f::"nat \<Rightarrow> real^'m::finite \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1037 |
assumes "convex s" "\<forall>n. \<forall>x\<in>s. ((f n) has_derivative (f' n x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1038 |
"\<forall>e>0. \<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm(f' n x h - g' x h) \<le> e * norm(h)" "0 < e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1039 |
shows "\<forall>e>0. \<exists>N. \<forall>m\<ge>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>y\<in>s. norm((f m x - f n x) - (f m y - f n y)) \<le> e * norm(x - y)" proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1040 |
case goal1 have *:"2 * (1/2* e) = e" "1/2 * e >0" using `e>0` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1041 |
guess N using assms(3)[rule_format,OF *(2)] .. |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1042 |
thus ?case apply(rule_tac x=N in exI) apply(rule has_derivative_sequence_lipschitz_lemma[where e="1/2 *e", unfolded *]) using assms by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1043 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1044 |
lemma has_derivative_sequence: fixes f::"nat\<Rightarrow>real^'m::finite\<Rightarrow>real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1045 |
assumes "convex s" "\<forall>n. \<forall>x\<in>s. ((f n) has_derivative (f' n x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1046 |
"\<forall>e>0. \<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm(f' n x h - g' x h) \<le> e * norm(h)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1047 |
"x0 \<in> s" "((\<lambda>n. f n x0) ---> l) sequentially" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1048 |
shows "\<exists>g. \<forall>x\<in>s. ((\<lambda>n. f n x) ---> g x) sequentially \<and> (g has_derivative g'(x)) (at x within s)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1049 |
have lem1:"\<forall>e>0. \<exists>N. \<forall>m\<ge>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>y\<in>s. norm((f m x - f n x) - (f m y - f n y)) \<le> e * norm(x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1050 |
apply(rule has_derivative_sequence_lipschitz[where e="42::nat"]) apply(rule assms)+ by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1051 |
have "\<exists>g. \<forall>x\<in>s. ((\<lambda>n. f n x) ---> g x) sequentially" apply(rule bchoice) unfolding convergent_eq_cauchy proof |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1052 |
fix x assume "x\<in>s" show "Cauchy (\<lambda>n. f n x)" proof(cases "x=x0") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1053 |
case True thus ?thesis using convergent_imp_cauchy[OF assms(5)] by auto next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1054 |
case False show ?thesis unfolding Cauchy_def proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1055 |
fix e::real assume "e>0" hence *:"e/2>0" "e/2/norm(x-x0)>0" using False by(auto intro!:divide_pos_pos) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1056 |
guess M using convergent_imp_cauchy[OF assms(5), unfolded Cauchy_def, rule_format,OF *(1)] .. note M=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1057 |
guess N using lem1[rule_format,OF *(2)] .. note N = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1058 |
show " \<exists>M. \<forall>m\<ge>M. \<forall>n\<ge>M. dist (f m x) (f n x) < e" apply(rule_tac x="max M N" in exI) proof(default+) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1059 |
fix m n assume as:"max M N \<le>m" "max M N\<le>n" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1060 |
have "dist (f m x) (f n x) \<le> norm (f m x0 - f n x0) + norm (f m x - f n x - (f m x0 - f n x0))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1061 |
unfolding vector_dist_norm by(rule norm_triangle_sub) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1062 |
also have "\<dots> \<le> norm (f m x0 - f n x0) + e / 2" using N[rule_format,OF _ _ `x\<in>s` `x0\<in>s`, of m n] and as and False by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1063 |
also have "\<dots> < e / 2 + e / 2" apply(rule add_strict_right_mono) using as and M[rule_format] unfolding vector_dist_norm by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1064 |
finally show "dist (f m x) (f n x) < e" by auto qed qed qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1065 |
then guess g .. note g = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1066 |
have lem2:"\<forall>e>0. \<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>y\<in>s. norm((f n x - f n y) - (g x - g y)) \<le> e * norm(x - y)" proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1067 |
fix e::real assume *:"e>0" guess N using lem1[rule_format,OF *] .. note N=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1068 |
show "\<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>y\<in>s. norm (f n x - f n y - (g x - g y)) \<le> e * norm (x - y)" apply(rule_tac x=N in exI) proof(default+) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1069 |
fix n x y assume as:"N \<le> n" "x \<in> s" "y \<in> s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1070 |
have "eventually (\<lambda>xa. norm (f n x - f n y - (f xa x - f xa y)) \<le> e * norm (x - y)) sequentially" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1071 |
unfolding eventually_sequentially apply(rule_tac x=N in exI) proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1072 |
fix m assume "N\<le>m" thus "norm (f n x - f n y - (f m x - f m y)) \<le> e * norm (x - y)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1073 |
using N[rule_format, of n m x y] and as by(auto simp add:group_simps) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1074 |
thus "norm (f n x - f n y - (g x - g y)) \<le> e * norm (x - y)" apply- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1075 |
apply(rule Lim_norm_ubound[OF trivial_limit_sequentially, where f="\<lambda>m. (f n x - f n y) - (f m x - f m y)"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1076 |
apply(rule Lim_sub Lim_const g[rule_format] as)+ by assumption qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1077 |
show ?thesis unfolding has_derivative_within_alt apply(rule_tac x=g in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1078 |
apply(rule,rule,rule g[rule_format],assumption) proof fix x assume "x\<in>s" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1079 |
have lem3:"\<forall>u. ((\<lambda>n. f' n x u) ---> g' x u) sequentially" unfolding Lim_sequentially proof(rule,rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1080 |
fix u and e::real assume "e>0" show "\<exists>N. \<forall>n\<ge>N. dist (f' n x u) (g' x u) < e" proof(cases "u=0") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1081 |
case True guess N using assms(3)[rule_format,OF `e>0`] .. note N=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1082 |
show ?thesis apply(rule_tac x=N in exI) unfolding True |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1083 |
using N[rule_format,OF _ `x\<in>s`,of _ 0] and `e>0` by auto next |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1084 |
case False hence *:"e / 2 / norm u > 0" using `e>0` by(auto intro!: divide_pos_pos) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1085 |
guess N using assms(3)[rule_format,OF *] .. note N=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1086 |
show ?thesis apply(rule_tac x=N in exI) proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1087 |
show ?case unfolding vector_dist_norm using N[rule_format,OF goal1 `x\<in>s`, of u] False `e>0` |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1088 |
by (auto simp add:field_simps) qed qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1089 |
show "bounded_linear (g' x)" unfolding linear_linear linear_def apply(rule,rule,rule) defer proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1090 |
fix x' y z::"real^'m" and c::real |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1091 |
note lin = assms(2)[rule_format,OF `x\<in>s`,THEN derivative_linear] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1092 |
show "g' x (c *s x') = c *s g' x x'" apply(rule Lim_unique[OF trivial_limit_sequentially]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1093 |
apply(rule lem3[rule_format]) unfolding smult_conv_scaleR |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1094 |
unfolding lin[unfolded bounded_linear_def bounded_linear_axioms_def,THEN conjunct2,THEN conjunct1,rule_format] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1095 |
apply(rule Lim_cmul) by(rule lem3[rule_format]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1096 |
show "g' x (y + z) = g' x y + g' x z" apply(rule Lim_unique[OF trivial_limit_sequentially]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1097 |
apply(rule lem3[rule_format]) unfolding lin[unfolded bounded_linear_def additive_def,THEN conjunct1,rule_format] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1098 |
apply(rule Lim_add) by(rule lem3[rule_format])+ qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1099 |
show "\<forall>e>0. \<exists>d>0. \<forall>y\<in>s. norm (y - x) < d \<longrightarrow> norm (g y - g x - g' x (y - x)) \<le> e * norm (y - x)" proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1100 |
have *:"e/3>0" using goal1 by auto guess N1 using assms(3)[rule_format,OF *] .. note N1=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1101 |
guess N2 using lem2[rule_format,OF *] .. note N2=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1102 |
guess d1 using assms(2)[unfolded has_derivative_within_alt, rule_format,OF `x\<in>s`, of "max N1 N2",THEN conjunct2,rule_format,OF *] .. note d1=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1103 |
show ?case apply(rule_tac x=d1 in exI) apply(rule,rule d1[THEN conjunct1]) proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1104 |
fix y assume as:"y \<in> s" "norm (y - x) < d1" let ?N ="max N1 N2" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1105 |
have "norm (g y - g x - (f ?N y - f ?N x)) \<le> e /3 * norm (y - x)" apply(subst norm_minus_cancel[THEN sym]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1106 |
using N2[rule_format, OF _ `y\<in>s` `x\<in>s`, of ?N] by auto moreover |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1107 |
have "norm (f ?N y - f ?N x - f' ?N x (y - x)) \<le> e / 3 * norm (y - x)" using d1 and as by auto ultimately |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1108 |
have "norm (g y - g x - f' ?N x (y - x)) \<le> 2 * e / 3 * norm (y - x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1109 |
using norm_triangle_le[of "g y - g x - (f ?N y - f ?N x)" "f ?N y - f ?N x - f' ?N x (y - x)" "2 * e / 3 * norm (y - x)"] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1110 |
by (auto simp add:group_simps) moreover |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1111 |
have " norm (f' ?N x (y - x) - g' x (y - x)) \<le> e / 3 * norm (y - x)" using N1 `x\<in>s` by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1112 |
ultimately show "norm (g y - g x - g' x (y - x)) \<le> e * norm (y - x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1113 |
using norm_triangle_le[of "g y - g x - f' (max N1 N2) x (y - x)" "f' (max N1 N2) x (y - x) - g' x (y - x)"] by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1114 |
qed qed qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1115 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1116 |
subsection {* Can choose to line up antiderivatives if we want. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1117 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1118 |
lemma has_antiderivative_sequence: fixes f::"nat\<Rightarrow> real^'m::finite \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1119 |
assumes "convex s" "\<forall>n. \<forall>x\<in>s. ((f n) has_derivative (f' n x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1120 |
"\<forall>e>0. \<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm(f' n x h - g' x h) \<le> e * norm h" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1121 |
shows "\<exists>g. \<forall>x\<in>s. (g has_derivative g'(x)) (at x within s)" proof(cases "s={}")
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1122 |
case False then obtain a where "a\<in>s" by auto have *:"\<And>P Q. \<exists>g. \<forall>x\<in>s. P g x \<and> Q g x \<Longrightarrow> \<exists>g. \<forall>x\<in>s. Q g x" by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1123 |
show ?thesis apply(rule *) apply(rule has_derivative_sequence[OF assms(1) _ assms(3), of "\<lambda>n x. f n x + (f 0 a - f n a)"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1124 |
apply(rule,rule) apply(rule has_derivative_add_const, rule assms(2)[rule_format], assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1125 |
apply(rule `a\<in>s`) by(auto intro!: Lim_const) qed auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1126 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1127 |
lemma has_antiderivative_limit: fixes g'::"real^'m::finite \<Rightarrow> real^'m::finite \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1128 |
assumes "convex s" "\<forall>e>0. \<exists>f f'. \<forall>x\<in>s. (f has_derivative (f' x)) (at x within s) \<and> (\<forall>h. norm(f' x h - g' x h) \<le> e * norm(h))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1129 |
shows "\<exists>g. \<forall>x\<in>s. (g has_derivative g'(x)) (at x within s)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1130 |
have *:"\<forall>n. \<exists>f f'. \<forall>x\<in>s. (f has_derivative (f' x)) (at x within s) \<and> (\<forall>h. norm(f' x h - g' x h) \<le> inverse (real (Suc n)) * norm(h))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1131 |
apply(rule) using assms(2) apply(erule_tac x="inverse (real (Suc n))" in allE) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1132 |
guess f using *[THEN choice] .. note * = this guess f' using *[THEN choice] .. note f=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1133 |
show ?thesis apply(rule has_antiderivative_sequence[OF assms(1), of f f']) defer proof(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1134 |
fix e::real assume "0<e" guess N using reals_Archimedean[OF `e>0`] .. note N=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1135 |
show "\<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm (f' n x h - g' x h) \<le> e * norm h" apply(rule_tac x=N in exI) proof(default+) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1136 |
have *:"inverse (real (Suc n)) \<le> e" apply(rule order_trans[OF _ N[THEN less_imp_le]]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1137 |
using goal1(1) by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1138 |
show ?case using f[rule_format,THEN conjunct2,OF goal1(2), of n, THEN spec[where x=h]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1139 |
apply(rule order_trans) using N * apply(cases "h=0") by auto qed qed(insert f,auto) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1140 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1141 |
subsection {* Differentiation of a series. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1142 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1143 |
definition sums_seq :: "(nat \<Rightarrow> 'a::real_normed_vector) \<Rightarrow> 'a \<Rightarrow> (nat set) \<Rightarrow> bool" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1144 |
(infixl "sums'_seq" 12) where "(f sums_seq l) s \<equiv> ((\<lambda>n. setsum f (s \<inter> {0..n})) ---> l) sequentially"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1145 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1146 |
lemma has_derivative_series: fixes f::"nat \<Rightarrow> real^'m::finite \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1147 |
assumes "convex s" "\<forall>n. \<forall>x\<in>s. ((f n) has_derivative (f' n x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1148 |
"\<forall>e>0. \<exists>N. \<forall>n\<ge>N. \<forall>x\<in>s. \<forall>h. norm(setsum (\<lambda>i. f' i x h) (k \<inter> {0..n}) - g' x h) \<le> e * norm(h)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1149 |
"x\<in>s" "((\<lambda>n. f n x) sums_seq l) k" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1150 |
shows "\<exists>g. \<forall>x\<in>s. ((\<lambda>n. f n x) sums_seq (g x)) k \<and> (g has_derivative g'(x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1151 |
unfolding sums_seq_def apply(rule has_derivative_sequence[OF assms(1) _ assms(3)]) apply(rule,rule) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1152 |
apply(rule has_derivative_setsum) defer apply(rule,rule assms(2)[rule_format],assumption) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1153 |
using assms(4-5) unfolding sums_seq_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1154 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1155 |
subsection {* Derivative with composed bilinear function. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1156 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1157 |
lemma has_derivative_bilinear_within: fixes h::"real^'m::finite \<Rightarrow> real^'n::finite \<Rightarrow> real^'p::finite" and f::"real^'q::finite \<Rightarrow> real^'m" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1158 |
assumes "(f has_derivative f') (at x within s)" "(g has_derivative g') (at x within s)" "bounded_bilinear h" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1159 |
shows "((\<lambda>x. h (f x) (g x)) has_derivative (\<lambda>d. h (f x) (g' d) + h (f' d) (g x))) (at x within s)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1160 |
have "(g ---> g x) (at x within s)" apply(rule differentiable_imp_continuous_within[unfolded continuous_within]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1161 |
using assms(2) unfolding differentiable_def by auto moreover |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1162 |
interpret f':bounded_linear f' using assms unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1163 |
interpret g':bounded_linear g' using assms unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1164 |
interpret h:bounded_bilinear h using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1165 |
have "((\<lambda>y. f' (y - x)) ---> 0) (at x within s)" unfolding f'.zero[THEN sym] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1166 |
apply(rule Lim_linear[of "\<lambda>y. y - x" 0 "at x within s" f']) using Lim_sub[OF Lim_within_id Lim_const, of x x s] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1167 |
unfolding id_def using assms(1) unfolding has_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1168 |
hence "((\<lambda>y. f x + f' (y - x)) ---> f x) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1169 |
using Lim_add[OF Lim_const, of "\<lambda>y. f' (y - x)" 0 "at x within s" "f x"] by auto ultimately |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1170 |
have *:"((\<lambda>x'. h (f x + f' (x' - x)) ((1/(norm (x' - x))) *\<^sub>R (g x' - (g x + g' (x' - x)))) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1171 |
+ h ((1/ (norm (x' - x))) *\<^sub>R (f x' - (f x + f' (x' - x)))) (g x')) ---> h (f x) 0 + h 0 (g x)) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1172 |
apply-apply(rule Lim_add) apply(rule_tac[!] Lim_bilinear[OF _ _ assms(3)]) using assms(1-2) unfolding has_derivative_within by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1173 |
guess B using bounded_bilinear.pos_bounded[OF assms(3)] .. note B=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1174 |
guess C using f'.pos_bounded .. note C=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1175 |
guess D using g'.pos_bounded .. note D=this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1176 |
have bcd:"B * C * D > 0" using B C D by (auto intro!: mult_pos_pos) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1177 |
have **:"((\<lambda>y. (1/(norm(y - x))) *\<^sub>R (h (f'(y - x)) (g'(y - x)))) ---> 0) (at x within s)" unfolding Lim_within proof(rule,rule) case goal1 |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1178 |
hence "e/(B*C*D)>0" using B C D by(auto intro!:divide_pos_pos mult_pos_pos) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1179 |
thus ?case apply(rule_tac x="e/(B*C*D)" in exI,rule) proof(rule,rule,erule conjE) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1180 |
fix y assume as:"y \<in> s" "0 < dist y x" "dist y x < e / (B * C * D)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1181 |
have "norm (h (f' (y - x)) (g' (y - x))) \<le> norm (f' (y - x)) * norm (g' (y - x)) * B" using B by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1182 |
also have "\<dots> \<le> (norm (y - x) * C) * (D * norm (y - x)) * B" apply(rule mult_right_mono) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1183 |
apply(rule pordered_semiring_class.mult_mono) using B C D by (auto simp add: field_simps intro!:mult_nonneg_nonneg) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1184 |
also have "\<dots> = (B * C * D * norm (y - x)) * norm (y - x)" by(auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1185 |
also have "\<dots> < e * norm (y - x)" apply(rule mult_strict_right_mono) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1186 |
using as(3)[unfolded vector_dist_norm] and as(2) unfolding pos_less_divide_eq[OF bcd] by (auto simp add:field_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1187 |
finally show "dist ((1 / norm (y - x)) *\<^sub>R h (f' (y - x)) (g' (y - x))) 0 < e" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1188 |
unfolding vector_dist_norm apply-apply(cases "y = x") by(auto simp add:field_simps) qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1189 |
have "bounded_linear (\<lambda>d. h (f x) (g' d) + h (f' d) (g x))" unfolding linear_linear linear_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1190 |
unfolding smult_conv_scaleR unfolding g'.add f'.scaleR f'.add g'.scaleR |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1191 |
unfolding h.add_right h.add_left scaleR_right_distrib h.scaleR_left h.scaleR_right by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1192 |
thus ?thesis using Lim_add[OF * **] unfolding has_derivative_within |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1193 |
unfolding smult_conv_scaleR unfolding g'.add f'.scaleR f'.add g'.scaleR f'.diff g'.diff |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1194 |
h.add_right h.add_left scaleR_right_distrib h.scaleR_left h.scaleR_right h.diff_right h.diff_left |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1195 |
scaleR_right_diff_distrib h.zero_right h.zero_left by(auto simp add:field_simps) qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1196 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1197 |
lemma has_derivative_bilinear_at: fixes h::"real^'m::finite \<Rightarrow> real^'n::finite \<Rightarrow> real^'p::finite" and f::"real^'p::finite \<Rightarrow> real^'m" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1198 |
assumes "(f has_derivative f') (at x)" "(g has_derivative g') (at x)" "bounded_bilinear h" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1199 |
shows "((\<lambda>x. h (f x) (g x)) has_derivative (\<lambda>d. h (f x) (g' d) + h (f' d) (g x))) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1200 |
using has_derivative_bilinear_within[of f f' x UNIV g g' h] unfolding within_UNIV using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1201 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1202 |
subsection {* Considering derivative R(^1)->R^n as a vector. *}
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1203 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1204 |
definition has_vector_derivative :: "(real \<Rightarrow> 'b::real_normed_vector) \<Rightarrow> ('b) \<Rightarrow> (real net \<Rightarrow> bool)"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1205 |
(infixl "has'_vector'_derivative" 12) where |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1206 |
"(f has_vector_derivative f') net \<equiv> (f has_derivative (\<lambda>x. x *\<^sub>R f')) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1207 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1208 |
definition "vector_derivative f net \<equiv> (SOME f'. (f has_vector_derivative f') net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1209 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1210 |
lemma vector_derivative_works: fixes f::"real \<Rightarrow> 'a::real_normed_vector" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1211 |
shows "f differentiable net \<longleftrightarrow> (f has_vector_derivative (vector_derivative f net)) net" (is "?l = ?r") |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1212 |
proof assume ?l guess f' using `?l`[unfolded differentiable_def] .. note f' = this |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1213 |
then interpret bounded_linear f' by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1214 |
thus ?r unfolding vector_derivative_def has_vector_derivative_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1215 |
apply-apply(rule someI_ex,rule_tac x="f' 1" in exI) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1216 |
using f' unfolding scaleR[THEN sym] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1217 |
next assume ?r thus ?l unfolding vector_derivative_def has_vector_derivative_def differentiable_def by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1218 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1219 |
lemma vector_derivative_unique_at: fixes f::"real\<Rightarrow>real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1220 |
assumes "(f has_vector_derivative f') (at x)" "(f has_vector_derivative f'') (at x)" shows "f' = f''" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1221 |
have *:"(\<lambda>x. x *\<^sub>R f') \<circ> dest_vec1 = (\<lambda>x. x *\<^sub>R f'') \<circ> dest_vec1" apply(rule frechet_derivative_unique_at) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1222 |
using assms[unfolded has_vector_derivative_def] unfolding has_derivative_at_dest_vec1[THEN sym] by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1223 |
show ?thesis proof(rule ccontr) assume "f' \<noteq> f''" moreover |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1224 |
hence "((\<lambda>x. x *\<^sub>R f') \<circ> dest_vec1) (vec1 1) = ((\<lambda>x. x *\<^sub>R f'') \<circ> dest_vec1) (vec1 1)" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1225 |
ultimately show False unfolding o_def vec1_dest_vec1 by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1226 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1227 |
lemma vector_derivative_unique_within_closed_interval: fixes f::"real \<Rightarrow> real^'n::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1228 |
assumes "a < b" "x \<in> {a..b}"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1229 |
"(f has_vector_derivative f') (at x within {a..b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1230 |
"(f has_vector_derivative f'') (at x within {a..b})" shows "f' = f''" proof-
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1231 |
have *:"(\<lambda>x. x *\<^sub>R f') \<circ> dest_vec1 = (\<lambda>x. x *\<^sub>R f'') \<circ> dest_vec1" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1232 |
apply(rule frechet_derivative_unique_within_closed_interval[of "vec1 a" "vec1 b"]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1233 |
using assms(3-)[unfolded has_vector_derivative_def] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1234 |
unfolding has_derivative_within_dest_vec1[THEN sym] vec1_interval using assms(1-2) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1235 |
show ?thesis proof(rule ccontr) assume "f' \<noteq> f''" moreover |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1236 |
hence "((\<lambda>x. x *\<^sub>R f') \<circ> dest_vec1) (vec1 1) = ((\<lambda>x. x *\<^sub>R f'') \<circ> dest_vec1) (vec1 1)" using * by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1237 |
ultimately show False unfolding o_def vec1_dest_vec1 by auto qed qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1238 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1239 |
lemma vector_derivative_at: fixes f::"real \<Rightarrow> real^'a::finite" shows |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1240 |
"(f has_vector_derivative f') (at x) \<Longrightarrow> vector_derivative f (at x) = f'" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1241 |
apply(rule vector_derivative_unique_at) defer apply assumption |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1242 |
unfolding vector_derivative_works[THEN sym] differentiable_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1243 |
unfolding has_vector_derivative_def by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1244 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1245 |
lemma vector_derivative_within_closed_interval: fixes f::"real \<Rightarrow> real^'a::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1246 |
assumes "a < b" "x \<in> {a..b}" "(f has_vector_derivative f') (at x within {a..b})"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1247 |
shows "vector_derivative f (at x within {a..b}) = f'"
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1248 |
apply(rule vector_derivative_unique_within_closed_interval) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1249 |
using vector_derivative_works[unfolded differentiable_def] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1250 |
using assms by(auto simp add:has_vector_derivative_def) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1251 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1252 |
lemma has_vector_derivative_within_subset: fixes f::"real \<Rightarrow> real^'a::finite" shows |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1253 |
"(f has_vector_derivative f') (at x within s) \<Longrightarrow> t \<subseteq> s \<Longrightarrow> (f has_vector_derivative f') (at x within t)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1254 |
unfolding has_vector_derivative_def apply(rule has_derivative_within_subset) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1255 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1256 |
lemma has_vector_derivative_const: fixes c::"real^'n::finite" shows |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1257 |
"((\<lambda>x. c) has_vector_derivative 0) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1258 |
unfolding has_vector_derivative_def using has_derivative_const by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1259 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1260 |
lemma has_vector_derivative_id: "((\<lambda>x::real. x) has_vector_derivative 1) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1261 |
unfolding has_vector_derivative_def using has_derivative_id by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1262 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1263 |
lemma has_vector_derivative_cmul: fixes f::"real \<Rightarrow> real^'a::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1264 |
shows "(f has_vector_derivative f') net \<Longrightarrow> ((\<lambda>x. c *\<^sub>R f x) has_vector_derivative (c *\<^sub>R f')) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1265 |
unfolding has_vector_derivative_def apply(drule has_derivative_cmul) by(auto simp add:group_simps) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1266 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1267 |
lemma has_vector_derivative_cmul_eq: fixes f::"real \<Rightarrow> real^'a::finite" assumes "c \<noteq> 0" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1268 |
shows "(((\<lambda>x. c *\<^sub>R f x) has_vector_derivative (c *\<^sub>R f')) net \<longleftrightarrow> (f has_vector_derivative f') net)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1269 |
apply rule apply(drule has_vector_derivative_cmul[where c="1/c"]) defer |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1270 |
apply(rule has_vector_derivative_cmul) using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1271 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1272 |
lemma has_vector_derivative_neg: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1273 |
"(f has_vector_derivative f') net \<Longrightarrow> ((\<lambda>x. -(f x)) has_vector_derivative (- f')) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1274 |
unfolding has_vector_derivative_def apply(drule has_derivative_neg) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1275 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1276 |
lemma has_vector_derivative_add: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1277 |
assumes "(f has_vector_derivative f') net" "(g has_vector_derivative g') net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1278 |
shows "((\<lambda>x. f(x) + g(x)) has_vector_derivative (f' + g')) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1279 |
using has_derivative_add[OF assms[unfolded has_vector_derivative_def]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1280 |
unfolding has_vector_derivative_def unfolding scaleR_right_distrib by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1281 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1282 |
lemma has_vector_derivative_sub: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1283 |
assumes "(f has_vector_derivative f') net" "(g has_vector_derivative g') net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1284 |
shows "((\<lambda>x. f(x) - g(x)) has_vector_derivative (f' - g')) net" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1285 |
using has_derivative_sub[OF assms[unfolded has_vector_derivative_def]] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1286 |
unfolding has_vector_derivative_def scaleR_right_diff_distrib by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1287 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1288 |
lemma has_vector_derivative_bilinear_within: fixes h::"real^'m::finite \<Rightarrow> real^'n::finite \<Rightarrow> real^'p::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1289 |
assumes "(f has_vector_derivative f') (at x within s)" "(g has_vector_derivative g') (at x within s)" "bounded_bilinear h" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1290 |
shows "((\<lambda>x. h (f x) (g x)) has_vector_derivative (h (f x) g' + h f' (g x))) (at x within s)" proof- |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1291 |
interpret bounded_bilinear h using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1292 |
show ?thesis using has_derivative_bilinear_within[OF assms(1-2)[unfolded has_vector_derivative_def has_derivative_within_dest_vec1[THEN sym]], where h=h] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1293 |
unfolding o_def vec1_dest_vec1 has_vector_derivative_def |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1294 |
unfolding has_derivative_within_dest_vec1[unfolded o_def, where f="\<lambda>x. h (f x) (g x)" and f'="\<lambda>d. h (f x) (d *\<^sub>R g') + h (d *\<^sub>R f') (g x)"] |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1295 |
using assms(3) unfolding scaleR_right scaleR_left scaleR_right_distrib by auto qed |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1296 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1297 |
lemma has_vector_derivative_bilinear_at: fixes h::"real^'m::finite \<Rightarrow> real^'n::finite \<Rightarrow> real^'p::finite" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1298 |
assumes "(f has_vector_derivative f') (at x)" "(g has_vector_derivative g') (at x)" "bounded_bilinear h" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1299 |
shows "((\<lambda>x. h (f x) (g x)) has_vector_derivative (h (f x) g' + h f' (g x))) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1300 |
apply(rule has_vector_derivative_bilinear_within[where s=UNIV, unfolded within_UNIV]) using assms by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1301 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1302 |
lemma has_vector_derivative_at_within: "(f has_vector_derivative f') (at x) \<Longrightarrow> (f has_vector_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1303 |
unfolding has_vector_derivative_def apply(rule has_derivative_at_within) by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1304 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1305 |
lemma has_vector_derivative_transform_within: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1306 |
assumes "0 < d" "x \<in> s" "\<forall>x'\<in>s. dist x' x < d \<longrightarrow> f x' = g x'" "(f has_vector_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1307 |
shows "(g has_vector_derivative f') (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1308 |
using assms unfolding has_vector_derivative_def by(rule has_derivative_transform_within) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1309 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1310 |
lemma has_vector_derivative_transform_at: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1311 |
assumes "0 < d" "\<forall>x'. dist x' x < d \<longrightarrow> f x' = g x'" "(f has_vector_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1312 |
shows "(g has_vector_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1313 |
using assms unfolding has_vector_derivative_def by(rule has_derivative_transform_at) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1314 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1315 |
lemma has_vector_derivative_transform_within_open: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1316 |
assumes "open s" "x \<in> s" "\<forall>y\<in>s. f y = g y" "(f has_vector_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1317 |
shows "(g has_vector_derivative f') (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1318 |
using assms unfolding has_vector_derivative_def by(rule has_derivative_transform_within_open) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1319 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1320 |
lemma vector_diff_chain_at: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1321 |
assumes "(f has_vector_derivative f') (at x)" "(g has_vector_derivative g') (at (f x))" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1322 |
shows "((g \<circ> f) has_vector_derivative (f' *\<^sub>R g')) (at x)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1323 |
using assms(2) unfolding has_vector_derivative_def apply- apply(drule diff_chain_at[OF assms(1)[unfolded has_vector_derivative_def]]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1324 |
unfolding o_def scaleR.scaleR_left by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1325 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1326 |
lemma vector_diff_chain_within: |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1327 |
assumes "(f has_vector_derivative f') (at x within s)" "(g has_vector_derivative g') (at (f x) within f ` s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1328 |
shows "((g o f) has_vector_derivative (f' *\<^sub>R g')) (at x within s)" |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1329 |
using assms(2) unfolding has_vector_derivative_def apply- apply(drule diff_chain_within[OF assms(1)[unfolded has_vector_derivative_def]]) |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1330 |
unfolding o_def scaleR.scaleR_left by auto |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1331 |
|
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1332 |
end |
|
4c414d0835ab
Added derivation and Brouwer's fixpoint theorem in Multivariate Analysis (translated by Robert Himmelmann from HOL-light)
hoelzl
parents:
diff
changeset
|
1333 |