author | haftmann |
Tue, 12 May 2009 21:17:47 +0200 | |
changeset 31129 | d2cead76fca2 |
parent 31100 | 6a2e67fe4488 |
child 31203 | 5c8fb4fd67e0 |
permissions | -rw-r--r-- |
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(* Title : HOL/RealDef.thy |
5588 | 2 |
Author : Jacques D. Fleuriot |
3 |
Copyright : 1998 University of Cambridge |
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Conversion to Isar and new proofs by Lawrence C Paulson, 2003/4 |
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Additional contributions by Jeremy Avigad |
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*) |
7 |
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header{*Defining the Reals from the Positive Reals*} |
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|
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theory RealDef |
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imports PReal |
15131 | 12 |
begin |
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|
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definition |
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realrel :: "((preal * preal) * (preal * preal)) set" where |
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[code del]: "realrel = {p. \<exists>x1 y1 x2 y2. p = ((x1,y1),(x2,y2)) & x1+y2 = x2+y1}" |
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|
14484 | 18 |
typedef (Real) real = "UNIV//realrel" |
14269 | 19 |
by (auto simp add: quotient_def) |
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|
19765 | 21 |
definition |
14484 | 22 |
(** these don't use the overloaded "real" function: users don't see them **) |
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real_of_preal :: "preal => real" where |
28562 | 24 |
[code del]: "real_of_preal m = Abs_Real (realrel `` {(m + 1, 1)})" |
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|
25762 | 26 |
instantiation real :: "{zero, one, plus, minus, uminus, times, inverse, ord, abs, sgn}" |
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begin |
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definition |
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real_zero_def [code del]: "0 = Abs_Real(realrel``{(1, 1)})" |
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definition |
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real_one_def [code del]: "1 = Abs_Real(realrel``{(1 + 1, 1)})" |
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definition |
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real_add_def [code del]: "z + w = |
14484 | 37 |
contents (\<Union>(x,y) \<in> Rep_Real(z). \<Union>(u,v) \<in> Rep_Real(w). |
27964 | 38 |
{ Abs_Real(realrel``{(x+u, y+v)}) })" |
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definition |
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real_minus_def [code del]: "- r = contents (\<Union>(x,y) \<in> Rep_Real(r). { Abs_Real(realrel``{(y,x)}) })" |
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definition |
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real_diff_def [code del]: "r - (s::real) = r + - s" |
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definition |
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real_mult_def [code del]: |
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"z * w = |
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contents (\<Union>(x,y) \<in> Rep_Real(z). \<Union>(u,v) \<in> Rep_Real(w). |
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{ Abs_Real(realrel``{(x*u + y*v, x*v + y*u)}) })" |
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definition |
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real_inverse_def [code del]: "inverse (R::real) = (THE S. (R = 0 & S = 0) | S * R = 1)" |
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definition |
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real_divide_def [code del]: "R / (S::real) = R * inverse S" |
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definition |
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real_le_def [code del]: "z \<le> (w::real) \<longleftrightarrow> |
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(\<exists>x y u v. x+v \<le> u+y & (x,y) \<in> Rep_Real z & (u,v) \<in> Rep_Real w)" |
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definition |
28562 | 63 |
real_less_def [code del]: "x < (y\<Colon>real) \<longleftrightarrow> x \<le> y \<and> x \<noteq> y" |
5588 | 64 |
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definition |
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real_abs_def: "abs (r::real) = (if r < 0 then - r else r)" |
14334 | 67 |
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definition |
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real_sgn_def: "sgn (x::real) = (if x=0 then 0 else if 0<x then 1 else - 1)" |
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instance .. |
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end |
14334 | 74 |
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subsection {* Equivalence relation over positive reals *} |
14269 | 76 |
|
14270 | 77 |
lemma preal_trans_lemma: |
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assumes "x + y1 = x1 + y" |
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and "x + y2 = x2 + y" |
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shows "x1 + y2 = x2 + (y1::preal)" |
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81 |
proof - |
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have "(x1 + y2) + x = (x + y2) + x1" by (simp add: add_ac) |
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also have "... = (x2 + y) + x1" by (simp add: prems) |
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also have "... = x2 + (x1 + y)" by (simp add: add_ac) |
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also have "... = x2 + (x + y1)" by (simp add: prems) |
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also have "... = (x2 + y1) + x" by (simp add: add_ac) |
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finally have "(x1 + y2) + x = (x2 + y1) + x" . |
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thus ?thesis by (rule add_right_imp_eq) |
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qed |
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90 |
|
14269 | 91 |
|
14484 | 92 |
lemma realrel_iff [simp]: "(((x1,y1),(x2,y2)) \<in> realrel) = (x1 + y2 = x2 + y1)" |
93 |
by (simp add: realrel_def) |
|
14269 | 94 |
|
95 |
lemma equiv_realrel: "equiv UNIV realrel" |
|
30198 | 96 |
apply (auto simp add: equiv_def refl_on_def sym_def trans_def realrel_def) |
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apply (blast dest: preal_trans_lemma) |
14269 | 98 |
done |
99 |
||
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text{*Reduces equality of equivalence classes to the @{term realrel} relation: |
101 |
@{term "(realrel `` {x} = realrel `` {y}) = ((x,y) \<in> realrel)"} *} |
|
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lemmas equiv_realrel_iff = |
103 |
eq_equiv_class_iff [OF equiv_realrel UNIV_I UNIV_I] |
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104 |
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105 |
declare equiv_realrel_iff [simp] |
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106 |
||
14497 | 107 |
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14484 | 108 |
lemma realrel_in_real [simp]: "realrel``{(x,y)}: Real" |
109 |
by (simp add: Real_def realrel_def quotient_def, blast) |
|
14269 | 110 |
|
22958 | 111 |
declare Abs_Real_inject [simp] |
14484 | 112 |
declare Abs_Real_inverse [simp] |
14269 | 113 |
|
114 |
||
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text{*Case analysis on the representation of a real number as an equivalence |
116 |
class of pairs of positive reals.*} |
|
117 |
lemma eq_Abs_Real [case_names Abs_Real, cases type: real]: |
|
118 |
"(!!x y. z = Abs_Real(realrel``{(x,y)}) ==> P) ==> P" |
|
119 |
apply (rule Rep_Real [of z, unfolded Real_def, THEN quotientE]) |
|
120 |
apply (drule arg_cong [where f=Abs_Real]) |
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121 |
apply (auto simp add: Rep_Real_inverse) |
|
14269 | 122 |
done |
123 |
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124 |
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subsection {* Addition and Subtraction *} |
14269 | 126 |
|
127 |
lemma real_add_congruent2_lemma: |
|
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"[|a + ba = aa + b; ab + bc = ac + bb|] |
|
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==> a + ab + (ba + bc) = aa + ac + (b + (bb::preal))" |
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apply (simp add: add_assoc) |
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apply (rule add_left_commute [of ab, THEN ssubst]) |
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apply (simp add: add_assoc [symmetric]) |
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apply (simp add: add_ac) |
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done |
135 |
||
136 |
lemma real_add: |
|
14497 | 137 |
"Abs_Real (realrel``{(x,y)}) + Abs_Real (realrel``{(u,v)}) = |
138 |
Abs_Real (realrel``{(x+u, y+v)})" |
|
139 |
proof - |
|
15169 | 140 |
have "(\<lambda>z w. (\<lambda>(x,y). (\<lambda>(u,v). {Abs_Real (realrel `` {(x+u, y+v)})}) w) z) |
141 |
respects2 realrel" |
|
14497 | 142 |
by (simp add: congruent2_def, blast intro: real_add_congruent2_lemma) |
143 |
thus ?thesis |
|
144 |
by (simp add: real_add_def UN_UN_split_split_eq |
|
14658 | 145 |
UN_equiv_class2 [OF equiv_realrel equiv_realrel]) |
14497 | 146 |
qed |
14269 | 147 |
|
14484 | 148 |
lemma real_minus: "- Abs_Real(realrel``{(x,y)}) = Abs_Real(realrel `` {(y,x)})" |
149 |
proof - |
|
15169 | 150 |
have "(\<lambda>(x,y). {Abs_Real (realrel``{(y,x)})}) respects realrel" |
23288 | 151 |
by (simp add: congruent_def add_commute) |
14484 | 152 |
thus ?thesis |
153 |
by (simp add: real_minus_def UN_equiv_class [OF equiv_realrel]) |
|
154 |
qed |
|
14334 | 155 |
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156 |
instance real :: ab_group_add |
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157 |
proof |
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158 |
fix x y z :: real |
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159 |
show "(x + y) + z = x + (y + z)" |
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160 |
by (cases x, cases y, cases z, simp add: real_add add_assoc) |
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161 |
show "x + y = y + x" |
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by (cases x, cases y, simp add: real_add add_commute) |
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show "0 + x = x" |
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by (cases x, simp add: real_add real_zero_def add_ac) |
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165 |
show "- x + x = 0" |
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by (cases x, simp add: real_minus real_add real_zero_def add_commute) |
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167 |
show "x - y = x + - y" |
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168 |
by (simp add: real_diff_def) |
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169 |
qed |
14269 | 170 |
|
171 |
||
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172 |
subsection {* Multiplication *} |
14269 | 173 |
|
14329 | 174 |
lemma real_mult_congruent2_lemma: |
175 |
"!!(x1::preal). [| x1 + y2 = x2 + y1 |] ==> |
|
14484 | 176 |
x * x1 + y * y1 + (x * y2 + y * x2) = |
177 |
x * x2 + y * y2 + (x * y1 + y * x1)" |
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178 |
apply (simp add: add_left_commute add_assoc [symmetric]) |
23288 | 179 |
apply (simp add: add_assoc right_distrib [symmetric]) |
180 |
apply (simp add: add_commute) |
|
14269 | 181 |
done |
182 |
||
183 |
lemma real_mult_congruent2: |
|
15169 | 184 |
"(%p1 p2. |
14484 | 185 |
(%(x1,y1). (%(x2,y2). |
15169 | 186 |
{ Abs_Real (realrel``{(x1*x2 + y1*y2, x1*y2+y1*x2)}) }) p2) p1) |
187 |
respects2 realrel" |
|
14658 | 188 |
apply (rule congruent2_commuteI [OF equiv_realrel], clarify) |
23288 | 189 |
apply (simp add: mult_commute add_commute) |
14269 | 190 |
apply (auto simp add: real_mult_congruent2_lemma) |
191 |
done |
|
192 |
||
193 |
lemma real_mult: |
|
14484 | 194 |
"Abs_Real((realrel``{(x1,y1)})) * Abs_Real((realrel``{(x2,y2)})) = |
195 |
Abs_Real(realrel `` {(x1*x2+y1*y2,x1*y2+y1*x2)})" |
|
196 |
by (simp add: real_mult_def UN_UN_split_split_eq |
|
14658 | 197 |
UN_equiv_class2 [OF equiv_realrel equiv_realrel real_mult_congruent2]) |
14269 | 198 |
|
199 |
lemma real_mult_commute: "(z::real) * w = w * z" |
|
23288 | 200 |
by (cases z, cases w, simp add: real_mult add_ac mult_ac) |
14269 | 201 |
|
202 |
lemma real_mult_assoc: "((z1::real) * z2) * z3 = z1 * (z2 * z3)" |
|
14484 | 203 |
apply (cases z1, cases z2, cases z3) |
29667 | 204 |
apply (simp add: real_mult algebra_simps) |
14269 | 205 |
done |
206 |
||
207 |
lemma real_mult_1: "(1::real) * z = z" |
|
14484 | 208 |
apply (cases z) |
29667 | 209 |
apply (simp add: real_mult real_one_def algebra_simps) |
14269 | 210 |
done |
211 |
||
212 |
lemma real_add_mult_distrib: "((z1::real) + z2) * w = (z1 * w) + (z2 * w)" |
|
14484 | 213 |
apply (cases z1, cases z2, cases w) |
29667 | 214 |
apply (simp add: real_add real_mult algebra_simps) |
14269 | 215 |
done |
216 |
||
14329 | 217 |
text{*one and zero are distinct*} |
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218 |
lemma real_zero_not_eq_one: "0 \<noteq> (1::real)" |
14484 | 219 |
proof - |
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220 |
have "(1::preal) < 1 + 1" |
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221 |
by (simp add: preal_self_less_add_left) |
14484 | 222 |
thus ?thesis |
23288 | 223 |
by (simp add: real_zero_def real_one_def) |
14484 | 224 |
qed |
14269 | 225 |
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226 |
instance real :: comm_ring_1 |
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227 |
proof |
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huffman
parents:
23031
diff
changeset
|
228 |
fix x y z :: real |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
229 |
show "(x * y) * z = x * (y * z)" by (rule real_mult_assoc) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
230 |
show "x * y = y * x" by (rule real_mult_commute) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
231 |
show "1 * x = x" by (rule real_mult_1) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
232 |
show "(x + y) * z = x * z + y * z" by (rule real_add_mult_distrib) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
233 |
show "0 \<noteq> (1::real)" by (rule real_zero_not_eq_one) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
234 |
qed |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
235 |
|
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
236 |
subsection {* Inverse and Division *} |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
237 |
|
14484 | 238 |
lemma real_zero_iff: "Abs_Real (realrel `` {(x, x)}) = 0" |
23288 | 239 |
by (simp add: real_zero_def add_commute) |
14269 | 240 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
241 |
text{*Instead of using an existential quantifier and constructing the inverse |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
242 |
within the proof, we could define the inverse explicitly.*} |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
243 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
244 |
lemma real_mult_inverse_left_ex: "x \<noteq> 0 ==> \<exists>y. y*x = (1::real)" |
14484 | 245 |
apply (simp add: real_zero_def real_one_def, cases x) |
14269 | 246 |
apply (cut_tac x = xa and y = y in linorder_less_linear) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
247 |
apply (auto dest!: less_add_left_Ex simp add: real_zero_iff) |
14334 | 248 |
apply (rule_tac |
23287
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
249 |
x = "Abs_Real (realrel``{(1, inverse (D) + 1)})" |
14334 | 250 |
in exI) |
251 |
apply (rule_tac [2] |
|
23287
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
252 |
x = "Abs_Real (realrel``{(inverse (D) + 1, 1)})" |
14334 | 253 |
in exI) |
29667 | 254 |
apply (auto simp add: real_mult preal_mult_inverse_right algebra_simps) |
14269 | 255 |
done |
256 |
||
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
257 |
lemma real_mult_inverse_left: "x \<noteq> 0 ==> inverse(x)*x = (1::real)" |
14484 | 258 |
apply (simp add: real_inverse_def) |
23287
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
259 |
apply (drule real_mult_inverse_left_ex, safe) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
260 |
apply (rule theI, assumption, rename_tac z) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
261 |
apply (subgoal_tac "(z * x) * y = z * (x * y)") |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
262 |
apply (simp add: mult_commute) |
063039db59dd
define (1::preal); clean up instance declarations
huffman
parents:
23031
diff
changeset
|
263 |
apply (rule mult_assoc) |
14269 | 264 |
done |
14334 | 265 |
|
14341
a09441bd4f1e
Ring_and_Field now requires axiom add_left_imp_eq for semirings.
paulson
parents:
14335
diff
changeset
|
266 |
|
a09441bd4f1e
Ring_and_Field now requires axiom add_left_imp_eq for semirings.
paulson
parents:
14335
diff
changeset
|
267 |
subsection{*The Real Numbers form a Field*} |
a09441bd4f1e
Ring_and_Field now requires axiom add_left_imp_eq for semirings.
paulson
parents:
14335
diff
changeset
|
268 |
|
14334 | 269 |
instance real :: field |
270 |
proof |
|
271 |
fix x y z :: real |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
272 |
show "x \<noteq> 0 ==> inverse x * x = 1" by (rule real_mult_inverse_left) |
14430
5cb24165a2e1
new material from Avigad, and simplified treatment of division by 0
paulson
parents:
14426
diff
changeset
|
273 |
show "x / y = x * inverse y" by (simp add: real_divide_def) |
14334 | 274 |
qed |
275 |
||
276 |
||
14341
a09441bd4f1e
Ring_and_Field now requires axiom add_left_imp_eq for semirings.
paulson
parents:
14335
diff
changeset
|
277 |
text{*Inverse of zero! Useful to simplify certain equations*} |
14269 | 278 |
|
14334 | 279 |
lemma INVERSE_ZERO: "inverse 0 = (0::real)" |
14484 | 280 |
by (simp add: real_inverse_def) |
14334 | 281 |
|
282 |
instance real :: division_by_zero |
|
283 |
proof |
|
284 |
show "inverse 0 = (0::real)" by (rule INVERSE_ZERO) |
|
285 |
qed |
|
286 |
||
14269 | 287 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
288 |
subsection{*The @{text "\<le>"} Ordering*} |
14269 | 289 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
290 |
lemma real_le_refl: "w \<le> (w::real)" |
14484 | 291 |
by (cases w, force simp add: real_le_def) |
14269 | 292 |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
293 |
text{*The arithmetic decision procedure is not set up for type preal. |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
294 |
This lemma is currently unused, but it could simplify the proofs of the |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
295 |
following two lemmas.*} |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
296 |
lemma preal_eq_le_imp_le: |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
297 |
assumes eq: "a+b = c+d" and le: "c \<le> a" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
298 |
shows "b \<le> (d::preal)" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
299 |
proof - |
23288 | 300 |
have "c+d \<le> a+d" by (simp add: prems) |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
301 |
hence "a+b \<le> a+d" by (simp add: prems) |
23288 | 302 |
thus "b \<le> d" by simp |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
303 |
qed |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
304 |
|
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
305 |
lemma real_le_lemma: |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
306 |
assumes l: "u1 + v2 \<le> u2 + v1" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
307 |
and "x1 + v1 = u1 + y1" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
308 |
and "x2 + v2 = u2 + y2" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
309 |
shows "x1 + y2 \<le> x2 + (y1::preal)" |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
310 |
proof - |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
311 |
have "(x1+v1) + (u2+y2) = (u1+y1) + (x2+v2)" by (simp add: prems) |
23288 | 312 |
hence "(x1+y2) + (u2+v1) = (x2+y1) + (u1+v2)" by (simp add: add_ac) |
313 |
also have "... \<le> (x2+y1) + (u2+v1)" by (simp add: prems) |
|
314 |
finally show ?thesis by simp |
|
315 |
qed |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
316 |
|
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
317 |
lemma real_le: |
14484 | 318 |
"(Abs_Real(realrel``{(x1,y1)}) \<le> Abs_Real(realrel``{(x2,y2)})) = |
319 |
(x1 + y2 \<le> x2 + y1)" |
|
23288 | 320 |
apply (simp add: real_le_def) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
321 |
apply (auto intro: real_le_lemma) |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
322 |
done |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
323 |
|
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
324 |
lemma real_le_anti_sym: "[| z \<le> w; w \<le> z |] ==> z = (w::real)" |
15542 | 325 |
by (cases z, cases w, simp add: real_le) |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
326 |
|
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
327 |
lemma real_trans_lemma: |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
328 |
assumes "x + v \<le> u + y" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
329 |
and "u + v' \<le> u' + v" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
330 |
and "x2 + v2 = u2 + y2" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
331 |
shows "x + v' \<le> u' + (y::preal)" |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
332 |
proof - |
23288 | 333 |
have "(x+v') + (u+v) = (x+v) + (u+v')" by (simp add: add_ac) |
334 |
also have "... \<le> (u+y) + (u+v')" by (simp add: prems) |
|
335 |
also have "... \<le> (u+y) + (u'+v)" by (simp add: prems) |
|
336 |
also have "... = (u'+y) + (u+v)" by (simp add: add_ac) |
|
337 |
finally show ?thesis by simp |
|
15542 | 338 |
qed |
14269 | 339 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
340 |
lemma real_le_trans: "[| i \<le> j; j \<le> k |] ==> i \<le> (k::real)" |
14484 | 341 |
apply (cases i, cases j, cases k) |
342 |
apply (simp add: real_le) |
|
23288 | 343 |
apply (blast intro: real_trans_lemma) |
14334 | 344 |
done |
345 |
||
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
346 |
instance real :: order |
27682 | 347 |
proof |
348 |
fix u v :: real |
|
349 |
show "u < v \<longleftrightarrow> u \<le> v \<and> \<not> v \<le> u" |
|
350 |
by (auto simp add: real_less_def intro: real_le_anti_sym) |
|
351 |
qed (assumption | rule real_le_refl real_le_trans real_le_anti_sym)+ |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
352 |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
353 |
(* Axiom 'linorder_linear' of class 'linorder': *) |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
354 |
lemma real_le_linear: "(z::real) \<le> w | w \<le> z" |
23288 | 355 |
apply (cases z, cases w) |
356 |
apply (auto simp add: real_le real_zero_def add_ac) |
|
14334 | 357 |
done |
358 |
||
359 |
instance real :: linorder |
|
360 |
by (intro_classes, rule real_le_linear) |
|
361 |
||
362 |
||
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
363 |
lemma real_le_eq_diff: "(x \<le> y) = (x-y \<le> (0::real))" |
14484 | 364 |
apply (cases x, cases y) |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
365 |
apply (auto simp add: real_le real_zero_def real_diff_def real_add real_minus |
23288 | 366 |
add_ac) |
367 |
apply (simp_all add: add_assoc [symmetric]) |
|
15542 | 368 |
done |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
369 |
|
14484 | 370 |
lemma real_add_left_mono: |
371 |
assumes le: "x \<le> y" shows "z + x \<le> z + (y::real)" |
|
372 |
proof - |
|
27668 | 373 |
have "z + x - (z + y) = (z + -z) + (x - y)" |
29667 | 374 |
by (simp add: algebra_simps) |
14484 | 375 |
with le show ?thesis |
14754
a080eeeaec14
Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy
obua
parents:
14738
diff
changeset
|
376 |
by (simp add: real_le_eq_diff[of x] real_le_eq_diff[of "z+x"] diff_minus) |
14484 | 377 |
qed |
14334 | 378 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
379 |
lemma real_sum_gt_zero_less: "(0 < S + (-W::real)) ==> (W < S)" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
380 |
by (simp add: linorder_not_le [symmetric] real_le_eq_diff [of S] diff_minus) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
381 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
382 |
lemma real_less_sum_gt_zero: "(W < S) ==> (0 < S + (-W::real))" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
383 |
by (simp add: linorder_not_le [symmetric] real_le_eq_diff [of S] diff_minus) |
14334 | 384 |
|
385 |
lemma real_mult_order: "[| 0 < x; 0 < y |] ==> (0::real) < x * y" |
|
14484 | 386 |
apply (cases x, cases y) |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
387 |
apply (simp add: linorder_not_le [where 'a = real, symmetric] |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
388 |
linorder_not_le [where 'a = preal] |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
389 |
real_zero_def real_le real_mult) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
390 |
--{*Reduce to the (simpler) @{text "\<le>"} relation *} |
16973 | 391 |
apply (auto dest!: less_add_left_Ex |
29667 | 392 |
simp add: algebra_simps preal_self_less_add_left) |
14334 | 393 |
done |
394 |
||
395 |
lemma real_mult_less_mono2: "[| (0::real) < z; x < y |] ==> z * x < z * y" |
|
396 |
apply (rule real_sum_gt_zero_less) |
|
397 |
apply (drule real_less_sum_gt_zero [of x y]) |
|
398 |
apply (drule real_mult_order, assumption) |
|
399 |
apply (simp add: right_distrib) |
|
400 |
done |
|
401 |
||
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
402 |
instantiation real :: distrib_lattice |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
403 |
begin |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
404 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
405 |
definition |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
406 |
"(inf \<Colon> real \<Rightarrow> real \<Rightarrow> real) = min" |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
407 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
408 |
definition |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
409 |
"(sup \<Colon> real \<Rightarrow> real \<Rightarrow> real) = max" |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
410 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
411 |
instance |
22456 | 412 |
by default (auto simp add: inf_real_def sup_real_def min_max.sup_inf_distrib1) |
413 |
||
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
414 |
end |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
415 |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
416 |
|
14334 | 417 |
subsection{*The Reals Form an Ordered Field*} |
418 |
||
419 |
instance real :: ordered_field |
|
420 |
proof |
|
421 |
fix x y z :: real |
|
422 |
show "x \<le> y ==> z + x \<le> z + y" by (rule real_add_left_mono) |
|
22962 | 423 |
show "x < y ==> 0 < z ==> z * x < z * y" by (rule real_mult_less_mono2) |
424 |
show "\<bar>x\<bar> = (if x < 0 then -x else x)" by (simp only: real_abs_def) |
|
24506 | 425 |
show "sgn x = (if x=0 then 0 else if 0<x then 1 else - 1)" |
426 |
by (simp only: real_sgn_def) |
|
14334 | 427 |
qed |
428 |
||
25303
0699e20feabd
renamed lordered_*_* to lordered_*_add_*; further localization
haftmann
parents:
25162
diff
changeset
|
429 |
instance real :: lordered_ab_group_add .. |
0699e20feabd
renamed lordered_*_* to lordered_*_add_*; further localization
haftmann
parents:
25162
diff
changeset
|
430 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
431 |
text{*The function @{term real_of_preal} requires many proofs, but it seems |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
432 |
to be essential for proving completeness of the reals from that of the |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
433 |
positive reals.*} |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
434 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
435 |
lemma real_of_preal_add: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
436 |
"real_of_preal ((x::preal) + y) = real_of_preal x + real_of_preal y" |
29667 | 437 |
by (simp add: real_of_preal_def real_add algebra_simps) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
438 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
439 |
lemma real_of_preal_mult: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
440 |
"real_of_preal ((x::preal) * y) = real_of_preal x* real_of_preal y" |
29667 | 441 |
by (simp add: real_of_preal_def real_mult algebra_simps) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
442 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
443 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
444 |
text{*Gleason prop 9-4.4 p 127*} |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
445 |
lemma real_of_preal_trichotomy: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
446 |
"\<exists>m. (x::real) = real_of_preal m | x = 0 | x = -(real_of_preal m)" |
14484 | 447 |
apply (simp add: real_of_preal_def real_zero_def, cases x) |
23288 | 448 |
apply (auto simp add: real_minus add_ac) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
449 |
apply (cut_tac x = x and y = y in linorder_less_linear) |
23288 | 450 |
apply (auto dest!: less_add_left_Ex simp add: add_assoc [symmetric]) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
451 |
done |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
452 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
453 |
lemma real_of_preal_leD: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
454 |
"real_of_preal m1 \<le> real_of_preal m2 ==> m1 \<le> m2" |
23288 | 455 |
by (simp add: real_of_preal_def real_le) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
456 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
457 |
lemma real_of_preal_lessI: "m1 < m2 ==> real_of_preal m1 < real_of_preal m2" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
458 |
by (auto simp add: real_of_preal_leD linorder_not_le [symmetric]) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
459 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
460 |
lemma real_of_preal_lessD: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
461 |
"real_of_preal m1 < real_of_preal m2 ==> m1 < m2" |
23288 | 462 |
by (simp add: real_of_preal_def real_le linorder_not_le [symmetric]) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
463 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
464 |
lemma real_of_preal_less_iff [simp]: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
465 |
"(real_of_preal m1 < real_of_preal m2) = (m1 < m2)" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
466 |
by (blast intro: real_of_preal_lessI real_of_preal_lessD) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
467 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
468 |
lemma real_of_preal_le_iff: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
469 |
"(real_of_preal m1 \<le> real_of_preal m2) = (m1 \<le> m2)" |
23288 | 470 |
by (simp add: linorder_not_less [symmetric]) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
471 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
472 |
lemma real_of_preal_zero_less: "0 < real_of_preal m" |
23288 | 473 |
apply (insert preal_self_less_add_left [of 1 m]) |
474 |
apply (auto simp add: real_zero_def real_of_preal_def |
|
475 |
real_less_def real_le_def add_ac) |
|
476 |
apply (rule_tac x="m + 1" in exI, rule_tac x="1" in exI) |
|
477 |
apply (simp add: add_ac) |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
478 |
done |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
479 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
480 |
lemma real_of_preal_minus_less_zero: "- real_of_preal m < 0" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
481 |
by (simp add: real_of_preal_zero_less) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
482 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
483 |
lemma real_of_preal_not_minus_gt_zero: "~ 0 < - real_of_preal m" |
14484 | 484 |
proof - |
485 |
from real_of_preal_minus_less_zero |
|
486 |
show ?thesis by (blast dest: order_less_trans) |
|
487 |
qed |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
488 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
489 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
490 |
subsection{*Theorems About the Ordering*} |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
491 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
492 |
lemma real_gt_zero_preal_Ex: "(0 < x) = (\<exists>y. x = real_of_preal y)" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
493 |
apply (auto simp add: real_of_preal_zero_less) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
494 |
apply (cut_tac x = x in real_of_preal_trichotomy) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
495 |
apply (blast elim!: real_of_preal_not_minus_gt_zero [THEN notE]) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
496 |
done |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
497 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
498 |
lemma real_gt_preal_preal_Ex: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
499 |
"real_of_preal z < x ==> \<exists>y. x = real_of_preal y" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
500 |
by (blast dest!: real_of_preal_zero_less [THEN order_less_trans] |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
501 |
intro: real_gt_zero_preal_Ex [THEN iffD1]) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
502 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
503 |
lemma real_ge_preal_preal_Ex: |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
504 |
"real_of_preal z \<le> x ==> \<exists>y. x = real_of_preal y" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
505 |
by (blast dest: order_le_imp_less_or_eq real_gt_preal_preal_Ex) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
506 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
507 |
lemma real_less_all_preal: "y \<le> 0 ==> \<forall>x. y < real_of_preal x" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
508 |
by (auto elim: order_le_imp_less_or_eq [THEN disjE] |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
509 |
intro: real_of_preal_zero_less [THEN [2] order_less_trans] |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
510 |
simp add: real_of_preal_zero_less) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
511 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
512 |
lemma real_less_all_real2: "~ 0 < y ==> \<forall>x. y < real_of_preal x" |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
513 |
by (blast intro!: real_less_all_preal linorder_not_less [THEN iffD1]) |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
514 |
|
14334 | 515 |
|
516 |
subsection{*More Lemmas*} |
|
517 |
||
518 |
lemma real_mult_left_cancel: "(c::real) \<noteq> 0 ==> (c*a=c*b) = (a=b)" |
|
519 |
by auto |
|
520 |
||
521 |
lemma real_mult_right_cancel: "(c::real) \<noteq> 0 ==> (a*c=b*c) = (a=b)" |
|
522 |
by auto |
|
523 |
||
524 |
lemma real_mult_less_iff1 [simp]: "(0::real) < z ==> (x*z < y*z) = (x < y)" |
|
525 |
by (force elim: order_less_asym |
|
526 |
simp add: Ring_and_Field.mult_less_cancel_right) |
|
527 |
||
528 |
lemma real_mult_le_cancel_iff1 [simp]: "(0::real) < z ==> (x*z \<le> y*z) = (x\<le>y)" |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
529 |
apply (simp add: mult_le_cancel_right) |
23289 | 530 |
apply (blast intro: elim: order_less_asym) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
531 |
done |
14334 | 532 |
|
533 |
lemma real_mult_le_cancel_iff2 [simp]: "(0::real) < z ==> (z*x \<le> z*y) = (x\<le>y)" |
|
15923 | 534 |
by(simp add:mult_commute) |
14334 | 535 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
536 |
lemma real_inverse_gt_one: "[| (0::real) < x; x < 1 |] ==> 1 < inverse x" |
23289 | 537 |
by (simp add: one_less_inverse_iff) (* TODO: generalize/move *) |
14334 | 538 |
|
539 |
||
24198 | 540 |
subsection {* Embedding numbers into the Reals *} |
541 |
||
542 |
abbreviation |
|
543 |
real_of_nat :: "nat \<Rightarrow> real" |
|
544 |
where |
|
545 |
"real_of_nat \<equiv> of_nat" |
|
546 |
||
547 |
abbreviation |
|
548 |
real_of_int :: "int \<Rightarrow> real" |
|
549 |
where |
|
550 |
"real_of_int \<equiv> of_int" |
|
551 |
||
552 |
abbreviation |
|
553 |
real_of_rat :: "rat \<Rightarrow> real" |
|
554 |
where |
|
555 |
"real_of_rat \<equiv> of_rat" |
|
556 |
||
557 |
consts |
|
558 |
(*overloaded constant for injecting other types into "real"*) |
|
559 |
real :: "'a => real" |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
560 |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
561 |
defs (overloaded) |
28520 | 562 |
real_of_nat_def [code unfold]: "real == real_of_nat" |
563 |
real_of_int_def [code unfold]: "real == real_of_int" |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
564 |
|
16819 | 565 |
lemma real_eq_of_nat: "real = of_nat" |
24198 | 566 |
unfolding real_of_nat_def .. |
16819 | 567 |
|
568 |
lemma real_eq_of_int: "real = of_int" |
|
24198 | 569 |
unfolding real_of_int_def .. |
16819 | 570 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
571 |
lemma real_of_int_zero [simp]: "real (0::int) = 0" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
572 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
573 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
574 |
lemma real_of_one [simp]: "real (1::int) = (1::real)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
575 |
by (simp add: real_of_int_def) |
14334 | 576 |
|
16819 | 577 |
lemma real_of_int_add [simp]: "real(x + y) = real (x::int) + real y" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
578 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
579 |
|
16819 | 580 |
lemma real_of_int_minus [simp]: "real(-x) = -real (x::int)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
581 |
by (simp add: real_of_int_def) |
16819 | 582 |
|
583 |
lemma real_of_int_diff [simp]: "real(x - y) = real (x::int) - real y" |
|
584 |
by (simp add: real_of_int_def) |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
585 |
|
16819 | 586 |
lemma real_of_int_mult [simp]: "real(x * y) = real (x::int) * real y" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
587 |
by (simp add: real_of_int_def) |
14334 | 588 |
|
16819 | 589 |
lemma real_of_int_setsum [simp]: "real ((SUM x:A. f x)::int) = (SUM x:A. real(f x))" |
590 |
apply (subst real_eq_of_int)+ |
|
591 |
apply (rule of_int_setsum) |
|
592 |
done |
|
593 |
||
594 |
lemma real_of_int_setprod [simp]: "real ((PROD x:A. f x)::int) = |
|
595 |
(PROD x:A. real(f x))" |
|
596 |
apply (subst real_eq_of_int)+ |
|
597 |
apply (rule of_int_setprod) |
|
598 |
done |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
599 |
|
27668 | 600 |
lemma real_of_int_zero_cancel [simp, algebra, presburger]: "(real x = 0) = (x = (0::int))" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
601 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
602 |
|
27668 | 603 |
lemma real_of_int_inject [iff, algebra, presburger]: "(real (x::int) = real y) = (x = y)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
604 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
605 |
|
27668 | 606 |
lemma real_of_int_less_iff [iff, presburger]: "(real (x::int) < real y) = (x < y)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
607 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
608 |
|
27668 | 609 |
lemma real_of_int_le_iff [simp, presburger]: "(real (x::int) \<le> real y) = (x \<le> y)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
610 |
by (simp add: real_of_int_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
611 |
|
27668 | 612 |
lemma real_of_int_gt_zero_cancel_iff [simp, presburger]: "(0 < real (n::int)) = (0 < n)" |
16819 | 613 |
by (simp add: real_of_int_def) |
614 |
||
27668 | 615 |
lemma real_of_int_ge_zero_cancel_iff [simp, presburger]: "(0 <= real (n::int)) = (0 <= n)" |
16819 | 616 |
by (simp add: real_of_int_def) |
617 |
||
27668 | 618 |
lemma real_of_int_lt_zero_cancel_iff [simp, presburger]: "(real (n::int) < 0) = (n < 0)" |
16819 | 619 |
by (simp add: real_of_int_def) |
620 |
||
27668 | 621 |
lemma real_of_int_le_zero_cancel_iff [simp, presburger]: "(real (n::int) <= 0) = (n <= 0)" |
16819 | 622 |
by (simp add: real_of_int_def) |
623 |
||
16888 | 624 |
lemma real_of_int_abs [simp]: "real (abs x) = abs(real (x::int))" |
625 |
by (auto simp add: abs_if) |
|
626 |
||
16819 | 627 |
lemma int_less_real_le: "((n::int) < m) = (real n + 1 <= real m)" |
628 |
apply (subgoal_tac "real n + 1 = real (n + 1)") |
|
629 |
apply (simp del: real_of_int_add) |
|
630 |
apply auto |
|
631 |
done |
|
632 |
||
633 |
lemma int_le_real_less: "((n::int) <= m) = (real n < real m + 1)" |
|
634 |
apply (subgoal_tac "real m + 1 = real (m + 1)") |
|
635 |
apply (simp del: real_of_int_add) |
|
636 |
apply simp |
|
637 |
done |
|
638 |
||
639 |
lemma real_of_int_div_aux: "d ~= 0 ==> (real (x::int)) / (real d) = |
|
640 |
real (x div d) + (real (x mod d)) / (real d)" |
|
641 |
proof - |
|
642 |
assume "d ~= 0" |
|
643 |
have "x = (x div d) * d + x mod d" |
|
644 |
by auto |
|
645 |
then have "real x = real (x div d) * real d + real(x mod d)" |
|
646 |
by (simp only: real_of_int_mult [THEN sym] real_of_int_add [THEN sym]) |
|
647 |
then have "real x / real d = ... / real d" |
|
648 |
by simp |
|
649 |
then show ?thesis |
|
29667 | 650 |
by (auto simp add: add_divide_distrib algebra_simps prems) |
16819 | 651 |
qed |
652 |
||
653 |
lemma real_of_int_div: "(d::int) ~= 0 ==> d dvd n ==> |
|
654 |
real(n div d) = real n / real d" |
|
655 |
apply (frule real_of_int_div_aux [of d n]) |
|
656 |
apply simp |
|
30042 | 657 |
apply (simp add: dvd_eq_mod_eq_0) |
16819 | 658 |
done |
659 |
||
660 |
lemma real_of_int_div2: |
|
661 |
"0 <= real (n::int) / real (x) - real (n div x)" |
|
662 |
apply (case_tac "x = 0") |
|
663 |
apply simp |
|
664 |
apply (case_tac "0 < x") |
|
29667 | 665 |
apply (simp add: algebra_simps) |
16819 | 666 |
apply (subst real_of_int_div_aux) |
667 |
apply simp |
|
668 |
apply simp |
|
669 |
apply (subst zero_le_divide_iff) |
|
670 |
apply auto |
|
29667 | 671 |
apply (simp add: algebra_simps) |
16819 | 672 |
apply (subst real_of_int_div_aux) |
673 |
apply simp |
|
674 |
apply simp |
|
675 |
apply (subst zero_le_divide_iff) |
|
676 |
apply auto |
|
677 |
done |
|
678 |
||
679 |
lemma real_of_int_div3: |
|
680 |
"real (n::int) / real (x) - real (n div x) <= 1" |
|
681 |
apply(case_tac "x = 0") |
|
682 |
apply simp |
|
29667 | 683 |
apply (simp add: algebra_simps) |
16819 | 684 |
apply (subst real_of_int_div_aux) |
685 |
apply assumption |
|
686 |
apply simp |
|
687 |
apply (subst divide_le_eq) |
|
688 |
apply clarsimp |
|
689 |
apply (rule conjI) |
|
690 |
apply (rule impI) |
|
691 |
apply (rule order_less_imp_le) |
|
692 |
apply simp |
|
693 |
apply (rule impI) |
|
694 |
apply (rule order_less_imp_le) |
|
695 |
apply simp |
|
696 |
done |
|
697 |
||
698 |
lemma real_of_int_div4: "real (n div x) <= real (n::int) / real x" |
|
27964 | 699 |
by (insert real_of_int_div2 [of n x], simp) |
700 |
||
701 |
||
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
702 |
subsection{*Embedding the Naturals into the Reals*} |
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
703 |
|
14334 | 704 |
lemma real_of_nat_zero [simp]: "real (0::nat) = 0" |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
705 |
by (simp add: real_of_nat_def) |
14334 | 706 |
|
30082
43c5b7bfc791
make more proofs work whether or not One_nat_def is a simp rule
huffman
parents:
30042
diff
changeset
|
707 |
lemma real_of_nat_1 [simp]: "real (1::nat) = 1" |
43c5b7bfc791
make more proofs work whether or not One_nat_def is a simp rule
huffman
parents:
30042
diff
changeset
|
708 |
by (simp add: real_of_nat_def) |
43c5b7bfc791
make more proofs work whether or not One_nat_def is a simp rule
huffman
parents:
30042
diff
changeset
|
709 |
|
14334 | 710 |
lemma real_of_nat_one [simp]: "real (Suc 0) = (1::real)" |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
711 |
by (simp add: real_of_nat_def) |
14334 | 712 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
713 |
lemma real_of_nat_add [simp]: "real (m + n) = real (m::nat) + real n" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
714 |
by (simp add: real_of_nat_def) |
14334 | 715 |
|
716 |
(*Not for addsimps: often the LHS is used to represent a positive natural*) |
|
717 |
lemma real_of_nat_Suc: "real (Suc n) = real n + (1::real)" |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
718 |
by (simp add: real_of_nat_def) |
14334 | 719 |
|
720 |
lemma real_of_nat_less_iff [iff]: |
|
721 |
"(real (n::nat) < real m) = (n < m)" |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
722 |
by (simp add: real_of_nat_def) |
14334 | 723 |
|
724 |
lemma real_of_nat_le_iff [iff]: "(real (n::nat) \<le> real m) = (n \<le> m)" |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
725 |
by (simp add: real_of_nat_def) |
14334 | 726 |
|
727 |
lemma real_of_nat_ge_zero [iff]: "0 \<le> real (n::nat)" |
|
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
728 |
by (simp add: real_of_nat_def zero_le_imp_of_nat) |
14334 | 729 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
730 |
lemma real_of_nat_Suc_gt_zero: "0 < real (Suc n)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
731 |
by (simp add: real_of_nat_def del: of_nat_Suc) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
732 |
|
14334 | 733 |
lemma real_of_nat_mult [simp]: "real (m * n) = real (m::nat) * real n" |
23431
25ca91279a9b
change simp rules for of_nat to work like int did previously (reorient of_nat_Suc, remove of_nat_mult [simp]); preserve original variable names in legacy int theorems
huffman
parents:
23289
diff
changeset
|
734 |
by (simp add: real_of_nat_def of_nat_mult) |
14334 | 735 |
|
16819 | 736 |
lemma real_of_nat_setsum [simp]: "real ((SUM x:A. f x)::nat) = |
737 |
(SUM x:A. real(f x))" |
|
738 |
apply (subst real_eq_of_nat)+ |
|
739 |
apply (rule of_nat_setsum) |
|
740 |
done |
|
741 |
||
742 |
lemma real_of_nat_setprod [simp]: "real ((PROD x:A. f x)::nat) = |
|
743 |
(PROD x:A. real(f x))" |
|
744 |
apply (subst real_eq_of_nat)+ |
|
745 |
apply (rule of_nat_setprod) |
|
746 |
done |
|
747 |
||
748 |
lemma real_of_card: "real (card A) = setsum (%x.1) A" |
|
749 |
apply (subst card_eq_setsum) |
|
750 |
apply (subst real_of_nat_setsum) |
|
751 |
apply simp |
|
752 |
done |
|
753 |
||
14334 | 754 |
lemma real_of_nat_inject [iff]: "(real (n::nat) = real m) = (n = m)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
755 |
by (simp add: real_of_nat_def) |
14334 | 756 |
|
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
757 |
lemma real_of_nat_zero_iff [iff]: "(real (n::nat) = 0) = (n = 0)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
758 |
by (simp add: real_of_nat_def) |
14334 | 759 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
760 |
lemma real_of_nat_diff: "n \<le> m ==> real (m - n) = real (m::nat) - real n" |
23438
dd824e86fa8a
remove simp attribute from of_nat_diff, for backward compatibility with zdiff_int
huffman
parents:
23431
diff
changeset
|
761 |
by (simp add: add: real_of_nat_def of_nat_diff) |
14334 | 762 |
|
25162 | 763 |
lemma real_of_nat_gt_zero_cancel_iff [simp]: "(0 < real (n::nat)) = (0 < n)" |
25140 | 764 |
by (auto simp: real_of_nat_def) |
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
765 |
|
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
766 |
lemma real_of_nat_le_zero_cancel_iff [simp]: "(real (n::nat) \<le> 0) = (n = 0)" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
767 |
by (simp add: add: real_of_nat_def) |
14334 | 768 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
769 |
lemma not_real_of_nat_less_zero [simp]: "~ real (n::nat) < 0" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
770 |
by (simp add: add: real_of_nat_def) |
14334 | 771 |
|
25140 | 772 |
lemma real_of_nat_ge_zero_cancel_iff [simp]: "(0 \<le> real (n::nat))" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
773 |
by (simp add: add: real_of_nat_def) |
14334 | 774 |
|
16819 | 775 |
lemma nat_less_real_le: "((n::nat) < m) = (real n + 1 <= real m)" |
776 |
apply (subgoal_tac "real n + 1 = real (Suc n)") |
|
777 |
apply simp |
|
778 |
apply (auto simp add: real_of_nat_Suc) |
|
779 |
done |
|
780 |
||
781 |
lemma nat_le_real_less: "((n::nat) <= m) = (real n < real m + 1)" |
|
782 |
apply (subgoal_tac "real m + 1 = real (Suc m)") |
|
783 |
apply (simp add: less_Suc_eq_le) |
|
784 |
apply (simp add: real_of_nat_Suc) |
|
785 |
done |
|
786 |
||
787 |
lemma real_of_nat_div_aux: "0 < d ==> (real (x::nat)) / (real d) = |
|
788 |
real (x div d) + (real (x mod d)) / (real d)" |
|
789 |
proof - |
|
790 |
assume "0 < d" |
|
791 |
have "x = (x div d) * d + x mod d" |
|
792 |
by auto |
|
793 |
then have "real x = real (x div d) * real d + real(x mod d)" |
|
794 |
by (simp only: real_of_nat_mult [THEN sym] real_of_nat_add [THEN sym]) |
|
795 |
then have "real x / real d = \<dots> / real d" |
|
796 |
by simp |
|
797 |
then show ?thesis |
|
29667 | 798 |
by (auto simp add: add_divide_distrib algebra_simps prems) |
16819 | 799 |
qed |
800 |
||
801 |
lemma real_of_nat_div: "0 < (d::nat) ==> d dvd n ==> |
|
802 |
real(n div d) = real n / real d" |
|
803 |
apply (frule real_of_nat_div_aux [of d n]) |
|
804 |
apply simp |
|
805 |
apply (subst dvd_eq_mod_eq_0 [THEN sym]) |
|
806 |
apply assumption |
|
807 |
done |
|
808 |
||
809 |
lemma real_of_nat_div2: |
|
810 |
"0 <= real (n::nat) / real (x) - real (n div x)" |
|
25134
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
811 |
apply(case_tac "x = 0") |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
812 |
apply (simp) |
29667 | 813 |
apply (simp add: algebra_simps) |
25134
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
814 |
apply (subst real_of_nat_div_aux) |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
815 |
apply simp |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
816 |
apply simp |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
817 |
apply (subst zero_le_divide_iff) |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
818 |
apply simp |
16819 | 819 |
done |
820 |
||
821 |
lemma real_of_nat_div3: |
|
822 |
"real (n::nat) / real (x) - real (n div x) <= 1" |
|
25134
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
823 |
apply(case_tac "x = 0") |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
824 |
apply (simp) |
29667 | 825 |
apply (simp add: algebra_simps) |
25134
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
826 |
apply (subst real_of_nat_div_aux) |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
827 |
apply simp |
3d4953e88449
Eliminated most of the neq0_conv occurrences. As a result, many
nipkow
parents:
25112
diff
changeset
|
828 |
apply simp |
16819 | 829 |
done |
830 |
||
831 |
lemma real_of_nat_div4: "real (n div x) <= real (n::nat) / real x" |
|
29667 | 832 |
by (insert real_of_nat_div2 [of n x], simp) |
16819 | 833 |
|
14365
3d4df8c166ae
replacing HOL/Real/PRat, PNat by the rational number development
paulson
parents:
14348
diff
changeset
|
834 |
lemma real_of_int_real_of_nat: "real (int n) = real n" |
14378
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
835 |
by (simp add: real_of_nat_def real_of_int_def int_eq_of_nat) |
69c4d5997669
generic of_nat and of_int functions, and generalization of iszero
paulson
parents:
14369
diff
changeset
|
836 |
|
14426 | 837 |
lemma real_of_int_of_nat_eq [simp]: "real (of_nat n :: int) = real n" |
838 |
by (simp add: real_of_int_def real_of_nat_def) |
|
14334 | 839 |
|
16819 | 840 |
lemma real_nat_eq_real [simp]: "0 <= x ==> real(nat x) = real x" |
841 |
apply (subgoal_tac "real(int(nat x)) = real(nat x)") |
|
842 |
apply force |
|
843 |
apply (simp only: real_of_int_real_of_nat) |
|
844 |
done |
|
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
845 |
|
28001 | 846 |
|
847 |
subsection{* Rationals *} |
|
848 |
||
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
849 |
lemma Rats_real_nat[simp]: "real(n::nat) \<in> \<rat>" |
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
850 |
by (simp add: real_eq_of_nat) |
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
851 |
|
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
852 |
|
28001 | 853 |
lemma Rats_eq_int_div_int: |
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
854 |
"\<rat> = { real(i::int)/real(j::int) |i j. j \<noteq> 0}" (is "_ = ?S") |
28001 | 855 |
proof |
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
856 |
show "\<rat> \<subseteq> ?S" |
28001 | 857 |
proof |
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
858 |
fix x::real assume "x : \<rat>" |
28001 | 859 |
then obtain r where "x = of_rat r" unfolding Rats_def .. |
860 |
have "of_rat r : ?S" |
|
861 |
by (cases r)(auto simp add:of_rat_rat real_eq_of_int) |
|
862 |
thus "x : ?S" using `x = of_rat r` by simp |
|
863 |
qed |
|
864 |
next |
|
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
865 |
show "?S \<subseteq> \<rat>" |
28001 | 866 |
proof(auto simp:Rats_def) |
867 |
fix i j :: int assume "j \<noteq> 0" |
|
868 |
hence "real i / real j = of_rat(Fract i j)" |
|
869 |
by (simp add:of_rat_rat real_eq_of_int) |
|
870 |
thus "real i / real j \<in> range of_rat" by blast |
|
871 |
qed |
|
872 |
qed |
|
873 |
||
874 |
lemma Rats_eq_int_div_nat: |
|
28091
50f2d6ba024c
Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and
nipkow
parents:
28001
diff
changeset
|
875 |
"\<rat> = { real(i::int)/real(n::nat) |i n. n \<noteq> 0}" |
28001 | 876 |
proof(auto simp:Rats_eq_int_div_int) |
877 |
fix i j::int assume "j \<noteq> 0" |
|
878 |
show "EX (i'::int) (n::nat). real i/real j = real i'/real n \<and> 0<n" |
|
879 |
proof cases |
|
880 |
assume "j>0" |
|
881 |
hence "real i/real j = real i/real(nat j) \<and> 0<nat j" |
|
882 |
by (simp add: real_eq_of_int real_eq_of_nat of_nat_nat) |
|
883 |
thus ?thesis by blast |
|
884 |
next |
|
885 |
assume "~ j>0" |
|
886 |
hence "real i/real j = real(-i)/real(nat(-j)) \<and> 0<nat(-j)" using `j\<noteq>0` |
|
887 |
by (simp add: real_eq_of_int real_eq_of_nat of_nat_nat) |
|
888 |
thus ?thesis by blast |
|
889 |
qed |
|
890 |
next |
|
891 |
fix i::int and n::nat assume "0 < n" |
|
892 |
hence "real i/real n = real i/real(int n) \<and> int n \<noteq> 0" by simp |
|
893 |
thus "\<exists>(i'::int) j::int. real i/real n = real i'/real j \<and> j \<noteq> 0" by blast |
|
894 |
qed |
|
895 |
||
896 |
lemma Rats_abs_nat_div_natE: |
|
897 |
assumes "x \<in> \<rat>" |
|
898 |
obtains m n where "n \<noteq> 0" and "\<bar>x\<bar> = real m / real n" and "gcd m n = 1" |
|
899 |
proof - |
|
900 |
from `x \<in> \<rat>` obtain i::int and n::nat where "n \<noteq> 0" and "x = real i / real n" |
|
901 |
by(auto simp add: Rats_eq_int_div_nat) |
|
902 |
hence "\<bar>x\<bar> = real(nat(abs i)) / real n" by simp |
|
903 |
then obtain m :: nat where x_rat: "\<bar>x\<bar> = real m / real n" by blast |
|
904 |
let ?gcd = "gcd m n" |
|
905 |
from `n\<noteq>0` have gcd: "?gcd \<noteq> 0" by (simp add: gcd_zero) |
|
906 |
let ?k = "m div ?gcd" |
|
907 |
let ?l = "n div ?gcd" |
|
908 |
let ?gcd' = "gcd ?k ?l" |
|
909 |
have "?gcd dvd m" .. then have gcd_k: "?gcd * ?k = m" |
|
910 |
by (rule dvd_mult_div_cancel) |
|
911 |
have "?gcd dvd n" .. then have gcd_l: "?gcd * ?l = n" |
|
912 |
by (rule dvd_mult_div_cancel) |
|
913 |
from `n\<noteq>0` and gcd_l have "?l \<noteq> 0" by (auto iff del: neq0_conv) |
|
914 |
moreover |
|
915 |
have "\<bar>x\<bar> = real ?k / real ?l" |
|
916 |
proof - |
|
917 |
from gcd have "real ?k / real ?l = |
|
918 |
real (?gcd * ?k) / real (?gcd * ?l)" by simp |
|
919 |
also from gcd_k and gcd_l have "\<dots> = real m / real n" by simp |
|
920 |
also from x_rat have "\<dots> = \<bar>x\<bar>" .. |
|
921 |
finally show ?thesis .. |
|
922 |
qed |
|
923 |
moreover |
|
924 |
have "?gcd' = 1" |
|
925 |
proof - |
|
926 |
have "?gcd * ?gcd' = gcd (?gcd * ?k) (?gcd * ?l)" |
|
927 |
by (rule gcd_mult_distrib2) |
|
928 |
with gcd_k gcd_l have "?gcd * ?gcd' = ?gcd" by simp |
|
929 |
with gcd show ?thesis by simp |
|
930 |
qed |
|
931 |
ultimately show ?thesis .. |
|
932 |
qed |
|
933 |
||
934 |
||
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
935 |
subsection{*Numerals and Arithmetic*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
936 |
|
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
937 |
instantiation real :: number_ring |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
938 |
begin |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
939 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
940 |
definition |
28562 | 941 |
real_number_of_def [code del]: "number_of w = real_of_int w" |
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
942 |
|
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
943 |
instance |
24198 | 944 |
by intro_classes (simp add: real_number_of_def) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
945 |
|
25571
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
946 |
end |
c9e39eafc7a0
instantiation target rather than legacy instance
haftmann
parents:
25546
diff
changeset
|
947 |
|
25965 | 948 |
lemma [code unfold, symmetric, code post]: |
24198 | 949 |
"number_of k = real_of_int (number_of k)" |
950 |
unfolding number_of_is_id real_number_of_def .. |
|
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
951 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
952 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
953 |
text{*Collapse applications of @{term real} to @{term number_of}*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
954 |
lemma real_number_of [simp]: "real (number_of v :: int) = number_of v" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
955 |
by (simp add: real_of_int_def of_int_number_of_eq) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
956 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
957 |
lemma real_of_nat_number_of [simp]: |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
958 |
"real (number_of v :: nat) = |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
959 |
(if neg (number_of v :: int) then 0 |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
960 |
else (number_of v :: real))" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
961 |
by (simp add: real_of_int_real_of_nat [symmetric] int_nat_number_of) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
962 |
|
31100 | 963 |
declaration {* |
964 |
K (Lin_Arith.add_inj_thms [@{thm real_of_nat_le_iff} RS iffD2, @{thm real_of_nat_inject} RS iffD2] |
|
965 |
(* not needed because x < (y::nat) can be rewritten as Suc x <= y: real_of_nat_less_iff RS iffD2 *) |
|
966 |
#> Lin_Arith.add_inj_thms [@{thm real_of_int_le_iff} RS iffD2, @{thm real_of_int_inject} RS iffD2] |
|
967 |
(* not needed because x < (y::int) can be rewritten as x + 1 <= y: real_of_int_less_iff RS iffD2 *) |
|
968 |
#> Lin_Arith.add_simps [@{thm real_of_nat_zero}, @{thm real_of_nat_Suc}, @{thm real_of_nat_add}, |
|
969 |
@{thm real_of_nat_mult}, @{thm real_of_int_zero}, @{thm real_of_one}, |
|
970 |
@{thm real_of_int_add}, @{thm real_of_int_minus}, @{thm real_of_int_diff}, |
|
971 |
@{thm real_of_int_mult}, @{thm real_of_int_of_nat_eq}, |
|
972 |
@{thm real_of_nat_number_of}, @{thm real_number_of}] |
|
973 |
#> Lin_Arith.add_inj_const (@{const_name real}, HOLogic.natT --> HOLogic.realT) |
|
974 |
#> Lin_Arith.add_inj_const (@{const_name real}, HOLogic.intT --> HOLogic.realT)) |
|
975 |
*} |
|
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
976 |
|
19023
5652a536b7e8
* include generalised MVT in HyperReal (contributed by Benjamin Porter)
kleing
parents:
16973
diff
changeset
|
977 |
|
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
978 |
subsection{* Simprules combining x+y and 0: ARE THEY NEEDED?*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
979 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
980 |
text{*Needed in this non-standard form by Hyperreal/Transcendental*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
981 |
lemma real_0_le_divide_iff: |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
982 |
"((0::real) \<le> x/y) = ((x \<le> 0 | 0 \<le> y) & (0 \<le> x | y \<le> 0))" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
983 |
by (simp add: real_divide_def zero_le_mult_iff, auto) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
984 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
985 |
lemma real_add_minus_iff [simp]: "(x + - a = (0::real)) = (x=a)" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
986 |
by arith |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
987 |
|
15085
5693a977a767
removed some [iff] declarations from RealDef.thy, concerning inequalities
paulson
parents:
15077
diff
changeset
|
988 |
lemma real_add_eq_0_iff: "(x+y = (0::real)) = (y = -x)" |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
989 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
990 |
|
15085
5693a977a767
removed some [iff] declarations from RealDef.thy, concerning inequalities
paulson
parents:
15077
diff
changeset
|
991 |
lemma real_add_less_0_iff: "(x+y < (0::real)) = (y < -x)" |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
992 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
993 |
|
15085
5693a977a767
removed some [iff] declarations from RealDef.thy, concerning inequalities
paulson
parents:
15077
diff
changeset
|
994 |
lemma real_0_less_add_iff: "((0::real) < x+y) = (-x < y)" |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
995 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
996 |
|
15085
5693a977a767
removed some [iff] declarations from RealDef.thy, concerning inequalities
paulson
parents:
15077
diff
changeset
|
997 |
lemma real_add_le_0_iff: "(x+y \<le> (0::real)) = (y \<le> -x)" |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
998 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
999 |
|
15085
5693a977a767
removed some [iff] declarations from RealDef.thy, concerning inequalities
paulson
parents:
15077
diff
changeset
|
1000 |
lemma real_0_le_add_iff: "((0::real) \<le> x+y) = (-x \<le> y)" |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1001 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1002 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1003 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1004 |
(* |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1005 |
FIXME: we should have this, as for type int, but many proofs would break. |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1006 |
It replaces x+-y by x-y. |
15086 | 1007 |
declare real_diff_def [symmetric, simp] |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1008 |
*) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1009 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1010 |
subsubsection{*Density of the Reals*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1011 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1012 |
lemma real_lbound_gt_zero: |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1013 |
"[| (0::real) < d1; 0 < d2 |] ==> \<exists>e. 0 < e & e < d1 & e < d2" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1014 |
apply (rule_tac x = " (min d1 d2) /2" in exI) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1015 |
apply (simp add: min_def) |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1016 |
done |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1017 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1018 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1019 |
text{*Similar results are proved in @{text Ring_and_Field}*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1020 |
lemma real_less_half_sum: "x < y ==> x < (x+y) / (2::real)" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1021 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1022 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1023 |
lemma real_gt_half_sum: "x < y ==> (x+y)/(2::real) < y" |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1024 |
by auto |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1025 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1026 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1027 |
subsection{*Absolute Value Function for the Reals*} |
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1028 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1029 |
lemma abs_minus_add_cancel: "abs(x + (-y)) = abs (y + (-(x::real)))" |
15003 | 1030 |
by (simp add: abs_if) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1031 |
|
23289 | 1032 |
(* FIXME: redundant, but used by Integration/RealRandVar.thy in AFP *) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1033 |
lemma abs_le_interval_iff: "(abs x \<le> r) = (-r\<le>x & x\<le>(r::real))" |
14738 | 1034 |
by (force simp add: OrderedGroup.abs_le_iff) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1035 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1036 |
lemma abs_add_one_gt_zero [simp]: "(0::real) < 1 + abs(x)" |
15003 | 1037 |
by (simp add: abs_if) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1038 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1039 |
lemma abs_real_of_nat_cancel [simp]: "abs (real x) = real (x::nat)" |
22958 | 1040 |
by (rule abs_of_nonneg [OF real_of_nat_ge_zero]) |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1041 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1042 |
lemma abs_add_one_not_less_self [simp]: "~ abs(x) + (1::real) < x" |
20217
25b068a99d2b
linear arithmetic splits certain operators (e.g. min, max, abs)
webertj
parents:
19765
diff
changeset
|
1043 |
by simp |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1044 |
|
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1045 |
lemma abs_sum_triangle_ineq: "abs ((x::real) + y + (-l + -m)) \<le> abs(x + -l) + abs(y + -m)" |
20217
25b068a99d2b
linear arithmetic splits certain operators (e.g. min, max, abs)
webertj
parents:
19765
diff
changeset
|
1046 |
by simp |
14387
e96d5c42c4b0
Polymorphic treatment of binary arithmetic using axclasses
paulson
parents:
14378
diff
changeset
|
1047 |
|
26732 | 1048 |
instance real :: lordered_ring |
1049 |
proof |
|
1050 |
fix a::real |
|
1051 |
show "abs a = sup a (-a)" |
|
1052 |
by (auto simp add: real_abs_def sup_real_def) |
|
1053 |
qed |
|
1054 |
||
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1055 |
|
27544 | 1056 |
subsection {* Implementation of rational real numbers *} |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1057 |
|
27544 | 1058 |
definition Ratreal :: "rat \<Rightarrow> real" where |
1059 |
[simp]: "Ratreal = of_rat" |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1060 |
|
24623 | 1061 |
code_datatype Ratreal |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1062 |
|
27544 | 1063 |
lemma Ratreal_number_collapse [code post]: |
1064 |
"Ratreal 0 = 0" |
|
1065 |
"Ratreal 1 = 1" |
|
1066 |
"Ratreal (number_of k) = number_of k" |
|
1067 |
by simp_all |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1068 |
|
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1069 |
lemma zero_real_code [code, code unfold]: |
27544 | 1070 |
"0 = Ratreal 0" |
1071 |
by simp |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1072 |
|
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1073 |
lemma one_real_code [code, code unfold]: |
27544 | 1074 |
"1 = Ratreal 1" |
1075 |
by simp |
|
1076 |
||
1077 |
lemma number_of_real_code [code unfold]: |
|
1078 |
"number_of k = Ratreal (number_of k)" |
|
1079 |
by simp |
|
1080 |
||
1081 |
lemma Ratreal_number_of_quotient [code post]: |
|
1082 |
"Ratreal (number_of r) / Ratreal (number_of s) = number_of r / number_of s" |
|
1083 |
by simp |
|
1084 |
||
1085 |
lemma Ratreal_number_of_quotient2 [code post]: |
|
1086 |
"Ratreal (number_of r / number_of s) = number_of r / number_of s" |
|
1087 |
unfolding Ratreal_number_of_quotient [symmetric] Ratreal_def of_rat_divide .. |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1088 |
|
26513 | 1089 |
instantiation real :: eq |
1090 |
begin |
|
1091 |
||
27544 | 1092 |
definition "eq_class.eq (x\<Colon>real) y \<longleftrightarrow> x - y = 0" |
26513 | 1093 |
|
1094 |
instance by default (simp add: eq_real_def) |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1095 |
|
27544 | 1096 |
lemma real_eq_code [code]: "eq_class.eq (Ratreal x) (Ratreal y) \<longleftrightarrow> eq_class.eq x y" |
1097 |
by (simp add: eq_real_def eq) |
|
26513 | 1098 |
|
28351 | 1099 |
lemma real_eq_refl [code nbe]: |
1100 |
"eq_class.eq (x::real) x \<longleftrightarrow> True" |
|
1101 |
by (rule HOL.eq_refl) |
|
1102 |
||
26513 | 1103 |
end |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1104 |
|
27544 | 1105 |
lemma real_less_eq_code [code]: "Ratreal x \<le> Ratreal y \<longleftrightarrow> x \<le> y" |
27652
818666de6c24
refined code generator setup for rational numbers; more simplification rules for rational numbers
haftmann
parents:
27544
diff
changeset
|
1106 |
by (simp add: of_rat_less_eq) |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1107 |
|
27544 | 1108 |
lemma real_less_code [code]: "Ratreal x < Ratreal y \<longleftrightarrow> x < y" |
27652
818666de6c24
refined code generator setup for rational numbers; more simplification rules for rational numbers
haftmann
parents:
27544
diff
changeset
|
1109 |
by (simp add: of_rat_less) |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1110 |
|
27544 | 1111 |
lemma real_plus_code [code]: "Ratreal x + Ratreal y = Ratreal (x + y)" |
1112 |
by (simp add: of_rat_add) |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1113 |
|
27544 | 1114 |
lemma real_times_code [code]: "Ratreal x * Ratreal y = Ratreal (x * y)" |
1115 |
by (simp add: of_rat_mult) |
|
1116 |
||
1117 |
lemma real_uminus_code [code]: "- Ratreal x = Ratreal (- x)" |
|
1118 |
by (simp add: of_rat_minus) |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1119 |
|
27544 | 1120 |
lemma real_minus_code [code]: "Ratreal x - Ratreal y = Ratreal (x - y)" |
1121 |
by (simp add: of_rat_diff) |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1122 |
|
27544 | 1123 |
lemma real_inverse_code [code]: "inverse (Ratreal x) = Ratreal (inverse x)" |
1124 |
by (simp add: of_rat_inverse) |
|
1125 |
||
1126 |
lemma real_divide_code [code]: "Ratreal x / Ratreal y = Ratreal (x / y)" |
|
1127 |
by (simp add: of_rat_divide) |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1128 |
|
24623 | 1129 |
text {* Setup for SML code generator *} |
23031
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1130 |
|
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1131 |
types_code |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1132 |
real ("(int */ int)") |
23031
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1133 |
attach (term_of) {* |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1134 |
fun term_of_real (p, q) = |
24623 | 1135 |
let |
1136 |
val rT = HOLogic.realT |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1137 |
in |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1138 |
if q = 1 orelse p = 0 then HOLogic.mk_number rT p |
24623 | 1139 |
else @{term "op / \<Colon> real \<Rightarrow> real \<Rightarrow> real"} $ |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1140 |
HOLogic.mk_number rT p $ HOLogic.mk_number rT q |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1141 |
end; |
23031
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1142 |
*} |
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1143 |
attach (test) {* |
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1144 |
fun gen_real i = |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1145 |
let |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1146 |
val p = random_range 0 i; |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1147 |
val q = random_range 1 (i + 1); |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1148 |
val g = Integer.gcd p q; |
24630
351a308ab58d
simplified type int (eliminated IntInf.int, integer);
wenzelm
parents:
24623
diff
changeset
|
1149 |
val p' = p div g; |
351a308ab58d
simplified type int (eliminated IntInf.int, integer);
wenzelm
parents:
24623
diff
changeset
|
1150 |
val q' = q div g; |
25885 | 1151 |
val r = (if one_of [true, false] then p' else ~ p', |
1152 |
if p' = 0 then 0 else q') |
|
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1153 |
in |
25885 | 1154 |
(r, fn () => term_of_real r) |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1155 |
end; |
23031
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1156 |
*} |
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1157 |
|
9da9585c816e
added code generation based on Isabelle's rat type.
nipkow
parents:
22970
diff
changeset
|
1158 |
consts_code |
24623 | 1159 |
Ratreal ("(_)") |
24534
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1160 |
|
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1161 |
consts_code |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1162 |
"of_int :: int \<Rightarrow> real" ("\<module>real'_of'_int") |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1163 |
attach {* |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1164 |
fun real_of_int 0 = (0, 0) |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1165 |
| real_of_int i = (i, 1); |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1166 |
*} |
09b9a47904b7
New code generator setup (taken from Library/Executable_Real.thy,
berghofe
parents:
24506
diff
changeset
|
1167 |
|
5588 | 1168 |
end |