src/HOL/NthRoot.thy
author wenzelm
Sun, 31 Dec 2023 19:24:37 +0100
changeset 79409 e1895596e1b9
parent 78127 24b70433c2e8
child 80175 200107cdd3ac
permissions -rw-r--r--
minor performance tuning: proper Same.operation; clarified modules;
Ignore whitespace changes - Everywhere: Within whitespace: At end of lines:
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(*  Title:      HOL/NthRoot.thy
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    Author:     Jacques D. Fleuriot, 1998
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    Author:     Lawrence C Paulson, 2004
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*)
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section \<open>Nth Roots of Real Numbers\<close>
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theory NthRoot
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  imports Deriv
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begin
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subsection \<open>Existence of Nth Root\<close>
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text \<open>Existence follows from the Intermediate Value Theorem\<close>
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23009
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lemma realpow_pos_nth:
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  fixes a :: real
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  assumes n: "0 < n"
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    and a: "0 < a"
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  shows "\<exists>r>0. r ^ n = a"
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proof -
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  have "\<exists>r\<ge>0. r \<le> (max 1 a) \<and> r ^ n = a"
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  proof (rule IVT)
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    show "0 ^ n \<le> a"
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      using n a by (simp add: power_0_left)
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    show "0 \<le> max 1 a"
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      by simp
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    from n have n1: "1 \<le> n"
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      by simp
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    have "a \<le> max 1 a ^ 1"
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      by simp
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    also have "max 1 a ^ 1 \<le> max 1 a ^ n"
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      using n1 by (rule power_increasing) simp
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    finally show "a \<le> max 1 a ^ n" .
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    show "\<forall>r. 0 \<le> r \<and> r \<le> max 1 a \<longrightarrow> isCont (\<lambda>x. x ^ n) r"
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      by simp
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  qed
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  then obtain r where r: "0 \<le> r \<and> r ^ n = a"
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    by fast
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  with n a have "r \<noteq> 0"
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    by (auto simp add: power_0_left)
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  with r have "0 < r \<and> r ^ n = a"
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    by simp
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  then show ?thesis ..
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qed
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(* Used by Integration/RealRandVar.thy in AFP *)
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lemma realpow_pos_nth2: "(0::real) < a \<Longrightarrow> \<exists>r>0. r ^ Suc n = a"
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  by (blast intro: realpow_pos_nth)
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text \<open>Uniqueness of nth positive root.\<close>
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lemma realpow_pos_nth_unique: "0 < n \<Longrightarrow> 0 < a \<Longrightarrow> \<exists>!r. 0 < r \<and> r ^ n = a" for a :: real
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  by (auto intro!: realpow_pos_nth simp: power_eq_iff_eq_base)
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subsection \<open>Nth Root\<close>
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text \<open>
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  We define roots of negative reals such that \<open>root n (- x) = - root n x\<close>.
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  This allows us to omit side conditions from many theorems.
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\<close>
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lemma inj_sgn_power:
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  assumes "0 < n"
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  shows "inj (\<lambda>y. sgn y * \<bar>y\<bar>^n :: real)"
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    (is "inj ?f")
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proof (rule injI)
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  have x: "(0 < a \<and> b < 0) \<or> (a < 0 \<and> 0 < b) \<Longrightarrow> a \<noteq> b" for a b :: real
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    by auto
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  fix x y
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  assume "?f x = ?f y"
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  with power_eq_iff_eq_base[of n "\<bar>x\<bar>" "\<bar>y\<bar>"] \<open>0 < n\<close> show "x = y"
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    by (cases rule: linorder_cases[of 0 x, case_product linorder_cases[of 0 y]])
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       (simp_all add: x)
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qed
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lemma sgn_power_injE:
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  "sgn a * \<bar>a\<bar> ^ n = x \<Longrightarrow> x = sgn b * \<bar>b\<bar> ^ n \<Longrightarrow> 0 < n \<Longrightarrow> a = b"
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  for a b :: real
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  using inj_sgn_power[THEN injD, of n a b] by simp
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definition root :: "nat \<Rightarrow> real \<Rightarrow> real"
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  where "root n x = (if n = 0 then 0 else the_inv (\<lambda>y. sgn y * \<bar>y\<bar>^n) x)"
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lemma root_0 [simp]: "root 0 x = 0"
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  by (simp add: root_def)
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lemma root_sgn_power: "0 < n \<Longrightarrow> root n (sgn y * \<bar>y\<bar>^n) = y"
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  using the_inv_f_f[OF inj_sgn_power] by (simp add: root_def)
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dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
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lemma sgn_power_root:
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  assumes "0 < n"
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  shows "sgn (root n x) * \<bar>(root n x)\<bar>^n = x"
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    (is "?f (root n x) = x")
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proof (cases "x = 0")
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  case True
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  with assms root_sgn_power[of n 0] show ?thesis
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    by simp
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next
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  case False
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  with realpow_pos_nth[OF \<open>0 < n\<close>, of "\<bar>x\<bar>"]
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  obtain r where "0 < r" "r ^ n = \<bar>x\<bar>"
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    by auto
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  with \<open>x \<noteq> 0\<close> have S: "x \<in> range ?f"
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    by (intro image_eqI[of _ _ "sgn x * r"])
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       (auto simp: abs_mult sgn_mult power_mult_distrib abs_sgn_eq mult_sgn_abs)
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  from \<open>0 < n\<close> f_the_inv_into_f[OF inj_sgn_power[OF \<open>0 < n\<close>] this]  show ?thesis
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    by (simp add: root_def)
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qed
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lemma split_root: "P (root n x) \<longleftrightarrow> (n = 0 \<longrightarrow> P 0) \<and> (0 < n \<longrightarrow> (\<forall>y. sgn y * \<bar>y\<bar>^n = x \<longrightarrow> P y))"
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proof (cases "n = 0")
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  case True
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  then show ?thesis by simp
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next
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  case False
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  then show ?thesis
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    by simp (metis root_sgn_power sgn_power_root)
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qed
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lemma real_root_zero [simp]: "root n 0 = 0"
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  by (simp split: split_root add: sgn_zero_iff)
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dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
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lemma real_root_minus: "root n (- x) = - root n x"
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   126
  by (clarsimp split: split_root elim!: sgn_power_injE simp: sgn_minus)
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lemma real_root_less_mono: "0 < n \<Longrightarrow> x < y \<Longrightarrow> root n x < root n y"
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   129
proof (clarsimp split: split_root)
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   130
  have *: "0 < b \<Longrightarrow> a < 0 \<Longrightarrow> \<not> a > b" for a b :: real
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   131
    by auto
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  fix a b :: real
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  assume "0 < n" "sgn a * \<bar>a\<bar> ^ n < sgn b * \<bar>b\<bar> ^ n"
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   134
  then show "a < b"
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   135
    using power_less_imp_less_base[of a n b]
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   136
      power_less_imp_less_base[of "- b" n "- a"]
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   137
    by (simp add: sgn_real_def * [of "a ^ n" "- ((- b) ^ n)"]
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   138
        split: if_split_asm)
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   139
qed
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huffman
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   140
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lemma real_root_gt_zero: "0 < n \<Longrightarrow> 0 < x \<Longrightarrow> 0 < root n x"
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  using real_root_less_mono[of n 0 x] by simp
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lemma real_root_ge_zero: "0 \<le> x \<Longrightarrow> 0 \<le> root n x"
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  using real_root_gt_zero[of n x]
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  by (cases "n = 0") (auto simp add: le_less)
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lemma real_root_pow_pos: "0 < n \<Longrightarrow> 0 < x \<Longrightarrow> root n x ^ n = x"  (* TODO: rename *)
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  using sgn_power_root[of n x] real_root_gt_zero[of n x] by simp
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lemma real_root_pow_pos2 [simp]: "0 < n \<Longrightarrow> 0 \<le> x \<Longrightarrow> root n x ^ n = x"  (* TODO: rename *)
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  by (auto simp add: order_le_less real_root_pow_pos)
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lemma sgn_root: "0 < n \<Longrightarrow> sgn (root n x) = sgn x"
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   155
  by (auto split: split_root simp: sgn_real_def)
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   156
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lemma odd_real_root_pow: "odd n \<Longrightarrow> root n x ^ n = x"
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   158
  using sgn_power_root[of n x]
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   159
  by (simp add: odd_pos sgn_real_def split: if_split_asm)
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   160
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lemma real_root_power_cancel: "0 < n \<Longrightarrow> 0 \<le> x \<Longrightarrow> root n (x ^ n) = x"
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   162
  using root_sgn_power[of n x] by (auto simp add: le_less power_0_left)
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   163
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lemma odd_real_root_power_cancel: "odd n \<Longrightarrow> root n (x ^ n) = x"
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  using root_sgn_power[of n x]
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  by (simp add: odd_pos sgn_real_def power_0_left split: if_split_asm)
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   167
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lemma real_root_pos_unique: "0 < n \<Longrightarrow> 0 \<le> y \<Longrightarrow> y ^ n = x \<Longrightarrow> root n x = y"
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   169
  using root_sgn_power[of n y] by (auto simp add: le_less power_0_left)
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   170
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lemma odd_real_root_unique: "odd n \<Longrightarrow> y ^ n = x \<Longrightarrow> root n x = y"
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   172
  by (erule subst, rule odd_real_root_power_cancel)
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   173
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lemma real_root_one [simp]: "0 < n \<Longrightarrow> root n 1 = 1"
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  by (simp add: real_root_pos_unique)
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text \<open>Root function is strictly monotonic, hence injective.\<close>
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   178
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lemma real_root_le_mono: "0 < n \<Longrightarrow> x \<le> y \<Longrightarrow> root n x \<le> root n y"
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   180
  by (auto simp add: order_le_less real_root_less_mono)
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   181
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lemma real_root_less_iff [simp]: "0 < n \<Longrightarrow> root n x < root n y \<longleftrightarrow> x < y"
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   183
  by (cases "x < y") (simp_all add: real_root_less_mono linorder_not_less real_root_le_mono)
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   184
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lemma real_root_le_iff [simp]: "0 < n \<Longrightarrow> root n x \<le> root n y \<longleftrightarrow> x \<le> y"
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   186
  by (cases "x \<le> y") (simp_all add: real_root_le_mono linorder_not_le real_root_less_mono)
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   187
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lemma real_root_eq_iff [simp]: "0 < n \<Longrightarrow> root n x = root n y \<longleftrightarrow> x = y"
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   189
  by (simp add: order_eq_iff)
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   190
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   191
lemmas real_root_gt_0_iff [simp] = real_root_less_iff [where x=0, simplified]
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   192
lemmas real_root_lt_0_iff [simp] = real_root_less_iff [where y=0, simplified]
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   193
lemmas real_root_ge_0_iff [simp] = real_root_le_iff [where x=0, simplified]
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   194
lemmas real_root_le_0_iff [simp] = real_root_le_iff [where y=0, simplified]
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   195
lemmas real_root_eq_0_iff [simp] = real_root_eq_iff [where y=0, simplified]
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   196
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lemma real_root_gt_1_iff [simp]: "0 < n \<Longrightarrow> 1 < root n y \<longleftrightarrow> 1 < y"
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   198
  using real_root_less_iff [where x=1] by simp
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   199
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lemma real_root_lt_1_iff [simp]: "0 < n \<Longrightarrow> root n x < 1 \<longleftrightarrow> x < 1"
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   201
  using real_root_less_iff [where y=1] by simp
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   202
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lemma real_root_ge_1_iff [simp]: "0 < n \<Longrightarrow> 1 \<le> root n y \<longleftrightarrow> 1 \<le> y"
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   204
  using real_root_le_iff [where x=1] by simp
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   205
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lemma real_root_le_1_iff [simp]: "0 < n \<Longrightarrow> root n x \<le> 1 \<longleftrightarrow> x \<le> 1"
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   207
  using real_root_le_iff [where y=1] by simp
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   208
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lemma real_root_eq_1_iff [simp]: "0 < n \<Longrightarrow> root n x = 1 \<longleftrightarrow> x = 1"
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   210
  using real_root_eq_iff [where y=1] by simp
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   211
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   212
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   213
text \<open>Roots of multiplication and division.\<close>
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   214
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   215
lemma real_root_mult: "root n (x * y) = root n x * root n y"
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   216
  by (auto split: split_root elim!: sgn_power_injE
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   217
      simp: sgn_mult abs_mult power_mult_distrib)
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   218
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   219
lemma real_root_inverse: "root n (inverse x) = inverse (root n x)"
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   220
  by (auto split: split_root elim!: sgn_power_injE
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   221
      simp: power_inverse)
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   222
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   223
lemma real_root_divide: "root n (x / y) = root n x / root n y"
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   224
  by (simp add: divide_inverse real_root_mult real_root_inverse)
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   225
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   226
lemma real_root_abs: "0 < n \<Longrightarrow> root n \<bar>x\<bar> = \<bar>root n x\<bar>"
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   227
  by (simp add: abs_if real_root_minus)
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diff changeset
   228
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   229
lemma root_abs_power: "n > 0 \<Longrightarrow> abs (root n (y ^n)) = abs y"
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parents: 68611
diff changeset
   230
  using root_sgn_power [of n]
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paulson <lp15@cam.ac.uk>
parents: 68611
diff changeset
   231
  by (metis abs_ge_zero power_abs real_root_abs real_root_power_cancel)
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parents: 68611
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   232
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   233
lemma real_root_power: "0 < n \<Longrightarrow> root n (x ^ k) = root n x ^ k"
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hoelzl
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diff changeset
   234
  by (induct k) (simp_all add: real_root_mult)
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   235
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   236
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   237
text \<open>Roots of roots.\<close>
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   238
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   239
lemma real_root_Suc_0 [simp]: "root (Suc 0) x = x"
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   240
  by (simp add: odd_real_root_unique)
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diff changeset
   241
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   242
lemma real_root_mult_exp: "root (m * n) x = root m (root n x)"
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diff changeset
   243
  by (auto split: split_root elim!: sgn_power_injE
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   244
      simp: sgn_zero_iff sgn_mult power_mult[symmetric]
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   245
      abs_mult power_mult_distrib abs_sgn_eq)
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diff changeset
   246
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   247
lemma real_root_commute: "root m (root n x) = root n (root m x)"
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cc97b347b301 reduced name variants for assoc and commute on plus and mult
haftmann
parents: 57275
diff changeset
   248
  by (simp add: real_root_mult_exp [symmetric] mult.commute)
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diff changeset
   249
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   250
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   251
text \<open>Monotonicity in first argument.\<close>
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   252
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   253
lemma real_root_strict_decreasing:
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   254
  assumes "0 < n" "n < N" "1 < x"
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   255
  shows "root N x < root n x"
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diff changeset
   256
proof -
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diff changeset
   257
  from assms have "root n (root N x) ^ n < root N (root n x) ^ N"
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diff changeset
   258
    by (simp add: real_root_commute power_strict_increasing del: real_root_pow_pos2)
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   259
  with assms show ?thesis by simp
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   260
qed
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diff changeset
   261
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lemma real_root_strict_increasing:
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   263
  assumes "0 < n" "n < N" "0 < x" "x < 1"
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diff changeset
   264
  shows "root n x < root N x"
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diff changeset
   265
proof -
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diff changeset
   266
  from assms have "root N (root n x) ^ N < root n (root N x) ^ n"
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diff changeset
   267
    by (simp add: real_root_commute power_strict_decreasing del: real_root_pow_pos2)
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   268
  with assms show ?thesis by simp
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diff changeset
   269
qed
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diff changeset
   270
70722
ae2528273eeb A couple of new theorems, stolen from AFP entries
paulson <lp15@cam.ac.uk>
parents: 70378
diff changeset
   271
lemma real_root_decreasing: "0 < n \<Longrightarrow> n \<le> N \<Longrightarrow> 1 \<le> x \<Longrightarrow> root N x \<le> root n x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   272
  by (auto simp add: order_le_less real_root_strict_decreasing)
23257
9117e228a8e3 add new lemmas
huffman
parents: 23122
diff changeset
   273
70722
ae2528273eeb A couple of new theorems, stolen from AFP entries
paulson <lp15@cam.ac.uk>
parents: 70378
diff changeset
   274
lemma real_root_increasing: "0 < n \<Longrightarrow> n \<le> N \<Longrightarrow> 0 \<le> x \<Longrightarrow> x \<le> 1 \<Longrightarrow> root n x \<le> root N x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   275
  by (auto simp add: order_le_less real_root_strict_increasing)
23257
9117e228a8e3 add new lemmas
huffman
parents: 23122
diff changeset
   276
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   277
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   278
text \<open>Continuity and derivatives.\<close>
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   279
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   280
lemma isCont_real_root: "isCont (root n) x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   281
proof (cases "n > 0")
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   282
  case True
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   283
  let ?f = "\<lambda>y::real. sgn y * \<bar>y\<bar>^n"
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   284
  have "continuous_on ({0..} \<union> {.. 0}) (\<lambda>x. if 0 < x then x ^ n else - ((-x) ^ n) :: real)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   285
    using True by (intro continuous_on_If continuous_intros) auto
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   286
  then have "continuous_on UNIV ?f"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   287
    by (rule continuous_on_cong[THEN iffD1, rotated 2]) (auto simp: not_less le_less True)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   288
  then have [simp]: "isCont ?f x" for x
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   289
    by (simp add: continuous_on_eq_continuous_at)
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   290
  have "isCont (root n) (?f (root n x))"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   291
    by (rule isCont_inverse_function [where f="?f" and d=1]) (auto simp: root_sgn_power True)
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   292
  then show ?thesis
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   293
    by (simp add: sgn_power_root True)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   294
next
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   295
  case False
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   296
  then show ?thesis
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   297
    by (simp add: root_def[abs_def])
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   298
qed
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   299
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   300
lemma tendsto_real_root [tendsto_intros]:
61973
0c7e865fa7cb more symbols;
wenzelm
parents: 61969
diff changeset
   301
  "(f \<longlongrightarrow> x) F \<Longrightarrow> ((\<lambda>x. root n (f x)) \<longlongrightarrow> root n x) F"
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   302
  using isCont_tendsto_compose[OF isCont_real_root, of f x F] .
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   303
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   304
lemma continuous_real_root [continuous_intros]:
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   305
  "continuous F f \<Longrightarrow> continuous F (\<lambda>x. root n (f x))"
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   306
  unfolding continuous_def by (rule tendsto_real_root)
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   307
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   308
lemma continuous_on_real_root [continuous_intros]:
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   309
  "continuous_on s f \<Longrightarrow> continuous_on s (\<lambda>x. root n (f x))"
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   310
  unfolding continuous_on_def by (auto intro: tendsto_real_root)
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   311
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   312
lemma DERIV_real_root:
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   313
  assumes n: "0 < n"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   314
    and x: "0 < x"
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   315
  shows "DERIV (root n) x :> inverse (real n * root n x ^ (n - Suc 0))"
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   316
proof (rule DERIV_inverse_function)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   317
  show "0 < x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   318
    using x .
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   319
  show "x < x + 1"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   320
    by simp
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   321
  show "DERIV (\<lambda>x. x ^ n) (root n x) :> real n * root n x ^ (n - Suc 0)"
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   322
    by (rule DERIV_pow)
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   323
  show "real n * root n x ^ (n - Suc 0) \<noteq> 0"
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   324
    using n x by simp
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   325
  show "isCont (root n) x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   326
    by (rule isCont_real_root)
68611
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   327
qed (use n in auto)
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   328
23046
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   329
lemma DERIV_odd_real_root:
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   330
  assumes n: "odd n"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   331
    and x: "x \<noteq> 0"
23046
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   332
  shows "DERIV (root n) x :> inverse (real n * root n x ^ (n - Suc 0))"
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   333
proof (rule DERIV_inverse_function)
68611
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   334
  show "x - 1 < x" "x < x + 1"
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   335
    by auto
23046
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   336
  show "DERIV (\<lambda>x. x ^ n) (root n x) :> real n * root n x ^ (n - Suc 0)"
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   337
    by (rule DERIV_pow)
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   338
  show "real n * root n x ^ (n - Suc 0) \<noteq> 0"
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   339
    using odd_pos [OF n] x by simp
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   340
  show "isCont (root n) x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   341
    by (rule isCont_real_root)
68611
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   342
qed (use n odd_real_root_pow in auto)
23046
12f35ece221f add odd_real_root lemmas
huffman
parents: 23044
diff changeset
   343
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   344
lemma DERIV_even_real_root:
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   345
  assumes n: "0 < n"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   346
    and "even n"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   347
    and x: "x < 0"
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   348
  shows "DERIV (root n) x :> inverse (- real n * root n x ^ (n - Suc 0))"
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   349
proof (rule DERIV_inverse_function)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   350
  show "x - 1 < x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   351
    by simp
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   352
  show "x < 0"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   353
    using x .
68611
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   354
  show "- (root n y ^ n) = y" if "x - 1 < y" and "y < 0" for y
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   355
  proof -
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   356
    have "root n (-y) ^ n = -y" 
4bc4b5c0ccfc de-applying, etc.
paulson <lp15@cam.ac.uk>
parents: 68465
diff changeset
   357
      using that \<open>0 < n\<close> by simp
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   358
    with real_root_minus and \<open>even n\<close>
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   359
    show "- (root n y ^ n) = y" by simp
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   360
  qed
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   361
  show "DERIV (\<lambda>x. - (x ^ n)) (root n x) :> - real n * root n x ^ (n - Suc 0)"
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   362
    by  (auto intro!: derivative_eq_intros)
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   363
  show "- real n * root n x ^ (n - Suc 0) \<noteq> 0"
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   364
    using n x by simp
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   365
  show "isCont (root n) x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   366
    by (rule isCont_real_root)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   367
qed
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   368
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   369
lemma DERIV_real_root_generic:
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   370
  assumes "0 < n"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   371
    and "x \<noteq> 0"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   372
    and "even n \<Longrightarrow> 0 < x \<Longrightarrow> D = inverse (real n * root n x ^ (n - Suc 0))"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   373
    and "even n \<Longrightarrow> x < 0 \<Longrightarrow> D = - inverse (real n * root n x ^ (n - Suc 0))"
49753
a344f1a21211 eliminated spurious fact duplicates;
wenzelm
parents: 44349
diff changeset
   374
    and "odd n \<Longrightarrow> D = inverse (real n * root n x ^ (n - Suc 0))"
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   375
  shows "DERIV (root n) x :> D"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   376
  using assms
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   377
  by (cases "even n", cases "0 < x")
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   378
    (auto intro: DERIV_real_root[THEN DERIV_cong]
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   379
      DERIV_odd_real_root[THEN DERIV_cong]
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   380
      DERIV_even_real_root[THEN DERIV_cong])
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   381
70378
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   382
lemma power_tendsto_0_iff [simp]:
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   383
  fixes f :: "'a \<Rightarrow> real"
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   384
  assumes "n > 0"
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   385
  shows "((\<lambda>x. f x ^ n) \<longlongrightarrow> 0) F \<longleftrightarrow> (f \<longlongrightarrow> 0) F"
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   386
proof -
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   387
  have "((\<lambda>x. \<bar>root n (f x ^ n)\<bar>) \<longlongrightarrow> 0) F \<Longrightarrow> (f \<longlongrightarrow> 0) F"
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   388
    by (auto simp: assms root_abs_power tendsto_rabs_zero_iff)
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   389
  then have "((\<lambda>x. f x ^ n) \<longlongrightarrow> 0) F \<Longrightarrow> (f \<longlongrightarrow> 0) F"
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   390
    by (metis tendsto_real_root abs_0 real_root_zero tendsto_rabs)
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   391
  with assms show ?thesis
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   392
    by (auto simp: tendsto_null_power)
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   393
qed
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   394
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   395
subsection \<open>Square Root\<close>
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   396
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   397
definition sqrt :: "real \<Rightarrow> real"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   398
  where "sqrt = root 2"
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   399
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   400
lemma pos2: "0 < (2::nat)"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   401
  by simp
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   402
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   403
lemma real_sqrt_unique: "y\<^sup>2 = x \<Longrightarrow> 0 \<le> y \<Longrightarrow> sqrt x = y"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   404
  unfolding sqrt_def by (rule real_root_pos_unique [OF pos2])
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   405
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   406
lemma real_sqrt_abs [simp]: "sqrt (x\<^sup>2) = \<bar>x\<bar>"
70378
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   407
  by (metis power2_abs abs_ge_zero real_sqrt_unique)
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   408
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   409
lemma real_sqrt_pow2 [simp]: "0 \<le> x \<Longrightarrow> (sqrt x)\<^sup>2 = x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   410
  unfolding sqrt_def by (rule real_root_pow_pos2 [OF pos2])
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   411
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   412
lemma real_sqrt_pow2_iff [simp]: "(sqrt x)\<^sup>2 = x \<longleftrightarrow> 0 \<le> x"
70378
ebd108578ab1 more new material about analysis
paulson <lp15@cam.ac.uk>
parents: 70365
diff changeset
   413
  by (metis real_sqrt_pow2 zero_le_power2)
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   414
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   415
lemma real_sqrt_zero [simp]: "sqrt 0 = 0"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   416
  unfolding sqrt_def by (rule real_root_zero)
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   417
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   418
lemma real_sqrt_one [simp]: "sqrt 1 = 1"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   419
  unfolding sqrt_def by (rule real_root_one [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   420
56889
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   421
lemma real_sqrt_four [simp]: "sqrt 4 = 2"
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   422
  using real_sqrt_abs[of 2] by simp
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   423
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   424
lemma real_sqrt_minus: "sqrt (- x) = - sqrt x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   425
  unfolding sqrt_def by (rule real_root_minus)
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   426
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   427
lemma real_sqrt_mult: "sqrt (x * y) = sqrt x * sqrt y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   428
  unfolding sqrt_def by (rule real_root_mult)
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   429
56889
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   430
lemma real_sqrt_mult_self[simp]: "sqrt a * sqrt a = \<bar>a\<bar>"
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   431
  using real_sqrt_abs[of a] unfolding power2_eq_square real_sqrt_mult .
48a745e1bde7 avoid the Complex constructor, use the more natural Re/Im view; moved csqrt to Complex.
hoelzl
parents: 56536
diff changeset
   432
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   433
lemma real_sqrt_inverse: "sqrt (inverse x) = inverse (sqrt x)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   434
  unfolding sqrt_def by (rule real_root_inverse)
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   435
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   436
lemma real_sqrt_divide: "sqrt (x / y) = sqrt x / sqrt y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   437
  unfolding sqrt_def by (rule real_root_divide)
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   438
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   439
lemma real_sqrt_power: "sqrt (x ^ k) = sqrt x ^ k"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   440
  unfolding sqrt_def by (rule real_root_power [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   441
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   442
lemma real_sqrt_gt_zero: "0 < x \<Longrightarrow> 0 < sqrt x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   443
  unfolding sqrt_def by (rule real_root_gt_zero [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   444
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   445
lemma real_sqrt_ge_zero: "0 \<le> x \<Longrightarrow> 0 \<le> sqrt x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   446
  unfolding sqrt_def by (rule real_root_ge_zero)
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   447
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   448
lemma real_sqrt_less_mono: "x < y \<Longrightarrow> sqrt x < sqrt y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   449
  unfolding sqrt_def by (rule real_root_less_mono [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   450
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   451
lemma real_sqrt_le_mono: "x \<le> y \<Longrightarrow> sqrt x \<le> sqrt y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   452
  unfolding sqrt_def by (rule real_root_le_mono [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   453
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   454
lemma real_sqrt_less_iff [simp]: "sqrt x < sqrt y \<longleftrightarrow> x < y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   455
  unfolding sqrt_def by (rule real_root_less_iff [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   456
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   457
lemma real_sqrt_le_iff [simp]: "sqrt x \<le> sqrt y \<longleftrightarrow> x \<le> y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   458
  unfolding sqrt_def by (rule real_root_le_iff [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   459
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   460
lemma real_sqrt_eq_iff [simp]: "sqrt x = sqrt y \<longleftrightarrow> x = y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   461
  unfolding sqrt_def by (rule real_root_eq_iff [OF pos2])
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   462
78127
24b70433c2e8 New HOL Light material on metric spaces and topological spaces
paulson <lp15@cam.ac.uk>
parents: 70722
diff changeset
   463
lemma real_less_lsqrt: "0 \<le> y \<Longrightarrow> x < y\<^sup>2 \<Longrightarrow> sqrt x < y"
62381
a6479cb85944 New and revised material for (multivariate) analysis
paulson <lp15@cam.ac.uk>
parents: 62347
diff changeset
   464
  using real_sqrt_less_iff[of x "y\<^sup>2"] by simp
a6479cb85944 New and revised material for (multivariate) analysis
paulson <lp15@cam.ac.uk>
parents: 62347
diff changeset
   465
78127
24b70433c2e8 New HOL Light material on metric spaces and topological spaces
paulson <lp15@cam.ac.uk>
parents: 70722
diff changeset
   466
lemma real_le_lsqrt: "0 \<le> y \<Longrightarrow> x \<le> y\<^sup>2 \<Longrightarrow> sqrt x \<le> y"
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   467
  using real_sqrt_le_iff[of x "y\<^sup>2"] by simp
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   468
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   469
lemma real_le_rsqrt: "x\<^sup>2 \<le> y \<Longrightarrow> x \<le> sqrt y"
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   470
  using real_sqrt_le_mono[of "x\<^sup>2" y] by simp
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   471
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   472
lemma real_less_rsqrt: "x\<^sup>2 < y \<Longrightarrow> x < sqrt y"
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   473
  using real_sqrt_less_mono[of "x\<^sup>2" y] by simp
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   474
65552
f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications;
wenzelm
parents: 64267
diff changeset
   475
lemma real_sqrt_power_even:
63721
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   476
  assumes "even n" "x \<ge> 0"
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   477
  shows   "sqrt x ^ n = x ^ (n div 2)"
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   478
proof -
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   479
  from assms obtain k where "n = 2*k" by (auto elim!: evenE)
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   480
  with assms show ?thesis by (simp add: power_mult)
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   481
qed
492bb53c3420 More analysis lemmas
Manuel Eberl <eberlm@in.tum.de>
parents: 63558
diff changeset
   482
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   483
lemma sqrt_le_D: "sqrt x \<le> y \<Longrightarrow> x \<le> y\<^sup>2"
62131
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc.
paulson
parents: 61973
diff changeset
   484
  by (meson not_le real_less_rsqrt)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc.
paulson
parents: 61973
diff changeset
   485
67685
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   486
lemma sqrt_ge_absD: "\<bar>x\<bar> \<le> sqrt y \<Longrightarrow> x\<^sup>2 \<le> y"
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   487
  using real_sqrt_le_iff[of "x\<^sup>2"] by simp
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   488
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   489
lemma sqrt_even_pow2:
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   490
  assumes n: "even n"
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   491
  shows "sqrt (2 ^ n) = 2 ^ (n div 2)"
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   492
proof -
58709
efdc6c533bd3 prefer generic elimination rules for even/odd over specialized unfold rules for nat
haftmann
parents: 57514
diff changeset
   493
  from n obtain m where m: "n = 2 * m" ..
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   494
  from m have "sqrt (2 ^ n) = sqrt ((2 ^ m)\<^sup>2)"
57512
cc97b347b301 reduced name variants for assoc and commute on plus and mult
haftmann
parents: 57275
diff changeset
   495
    by (simp only: power_mult[symmetric] mult.commute)
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   496
  then show ?thesis
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   497
    using m by simp
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   498
qed
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   499
53594
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   500
lemmas real_sqrt_gt_0_iff [simp] = real_sqrt_less_iff [where x=0, unfolded real_sqrt_zero]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   501
lemmas real_sqrt_lt_0_iff [simp] = real_sqrt_less_iff [where y=0, unfolded real_sqrt_zero]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   502
lemmas real_sqrt_ge_0_iff [simp] = real_sqrt_le_iff [where x=0, unfolded real_sqrt_zero]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   503
lemmas real_sqrt_le_0_iff [simp] = real_sqrt_le_iff [where y=0, unfolded real_sqrt_zero]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   504
lemmas real_sqrt_eq_0_iff [simp] = real_sqrt_eq_iff [where y=0, unfolded real_sqrt_zero]
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   505
53594
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   506
lemmas real_sqrt_gt_1_iff [simp] = real_sqrt_less_iff [where x=1, unfolded real_sqrt_one]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   507
lemmas real_sqrt_lt_1_iff [simp] = real_sqrt_less_iff [where y=1, unfolded real_sqrt_one]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   508
lemmas real_sqrt_ge_1_iff [simp] = real_sqrt_le_iff [where x=1, unfolded real_sqrt_one]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   509
lemmas real_sqrt_le_1_iff [simp] = real_sqrt_le_iff [where y=1, unfolded real_sqrt_one]
8a9fb53294f4 prefer attribute 'unfolded thm' to 'simplified'
huffman
parents: 53076
diff changeset
   510
lemmas real_sqrt_eq_1_iff [simp] = real_sqrt_eq_iff [where y=1, unfolded real_sqrt_one]
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   511
60615
e5fa1d5d3952 Useful lemmas. The theorem concerning swapping the variables in a double integral.
paulson <lp15@cam.ac.uk>
parents: 60141
diff changeset
   512
lemma sqrt_add_le_add_sqrt:
e5fa1d5d3952 Useful lemmas. The theorem concerning swapping the variables in a double integral.
paulson <lp15@cam.ac.uk>
parents: 60141
diff changeset
   513
  assumes "0 \<le> x" "0 \<le> y"
e5fa1d5d3952 Useful lemmas. The theorem concerning swapping the variables in a double integral.
paulson <lp15@cam.ac.uk>
parents: 60141
diff changeset
   514
  shows "sqrt (x + y) \<le> sqrt x + sqrt y"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   515
  by (rule power2_le_imp_le) (simp_all add: power2_sum assms)
60615
e5fa1d5d3952 Useful lemmas. The theorem concerning swapping the variables in a double integral.
paulson <lp15@cam.ac.uk>
parents: 60141
diff changeset
   516
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   517
lemma isCont_real_sqrt: "isCont sqrt x"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   518
  unfolding sqrt_def by (rule isCont_real_root)
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   519
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   520
lemma tendsto_real_sqrt [tendsto_intros]:
61973
0c7e865fa7cb more symbols;
wenzelm
parents: 61969
diff changeset
   521
  "(f \<longlongrightarrow> x) F \<Longrightarrow> ((\<lambda>x. sqrt (f x)) \<longlongrightarrow> sqrt x) F"
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   522
  unfolding sqrt_def by (rule tendsto_real_root)
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   523
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   524
lemma continuous_real_sqrt [continuous_intros]:
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   525
  "continuous F f \<Longrightarrow> continuous F (\<lambda>x. sqrt (f x))"
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   526
  unfolding sqrt_def by (rule continuous_real_root)
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   527
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   528
lemma continuous_on_real_sqrt [continuous_intros]:
57155
5c59114ff0cb remove superfluous assumption
hoelzl
parents: 56889
diff changeset
   529
  "continuous_on s f \<Longrightarrow> continuous_on s (\<lambda>x. sqrt (f x))"
51483
dc39d69774bb modernized definition of root: use the_inv, handle positive and negative case uniformly, and 0-th root is constant 0
hoelzl
parents: 51478
diff changeset
   530
  unfolding sqrt_def by (rule continuous_on_real_root)
51478
270b21f3ae0a move continuous and continuous_on to the HOL image; isCont is an abbreviation for continuous (at x) (isCont is now restricted to a T2 space)
hoelzl
parents: 49962
diff changeset
   531
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   532
lemma DERIV_real_sqrt_generic:
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   533
  assumes "x \<noteq> 0"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   534
    and "x > 0 \<Longrightarrow> D = inverse (sqrt x) / 2"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   535
    and "x < 0 \<Longrightarrow> D = - inverse (sqrt x) / 2"
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   536
  shows "DERIV sqrt x :> D"
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   537
  using assms unfolding sqrt_def
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   538
  by (auto intro!: DERIV_real_root_generic)
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   539
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   540
lemma DERIV_real_sqrt: "0 < x \<Longrightarrow> DERIV sqrt x :> inverse (sqrt x) / 2"
31880
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   541
  using DERIV_real_sqrt_generic by simp
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   542
6fb86c61747c Added DERIV_intros
hoelzl
parents: 31014
diff changeset
   543
declare
56381
0556204bc230 merged DERIV_intros, has_derivative_intros into derivative_intros
hoelzl
parents: 56371
diff changeset
   544
  DERIV_real_sqrt_generic[THEN DERIV_chain2, derivative_intros]
0556204bc230 merged DERIV_intros, has_derivative_intros into derivative_intros
hoelzl
parents: 56371
diff changeset
   545
  DERIV_real_root_generic[THEN DERIV_chain2, derivative_intros]
23042
492514b39956 add lemmas about continuity and derivatives of roots
huffman
parents: 23009
diff changeset
   546
67685
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   547
lemmas has_derivative_real_sqrt[derivative_intros] = DERIV_real_sqrt[THEN DERIV_compose_FDERIV]
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   548
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   549
lemma not_real_square_gt_zero [simp]: "\<not> 0 < x * x \<longleftrightarrow> x = 0"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   550
  for x :: real
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   551
  apply auto
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   552
  using linorder_less_linear [where x = x and y = 0]
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   553
  apply (simp add: zero_less_mult_iff)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   554
  done
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   555
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   556
lemma real_sqrt_abs2 [simp]: "sqrt (x * x) = \<bar>x\<bar>"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   557
  apply (subst power2_eq_square [symmetric])
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   558
  apply (rule real_sqrt_abs)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   559
  done
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   560
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   561
lemma real_inv_sqrt_pow2: "0 < x \<Longrightarrow> (inverse (sqrt x))\<^sup>2 = inverse x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   562
  by (simp add: power_inverse)
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   563
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   564
lemma real_sqrt_eq_zero_cancel: "0 \<le> x \<Longrightarrow> sqrt x = 0 \<Longrightarrow> x = 0"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   565
  by simp
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   566
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   567
lemma real_sqrt_ge_one: "1 \<le> x \<Longrightarrow> 1 \<le> sqrt x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   568
  by simp
20687
fedb901be392 move root and sqrt stuff from Transcendental to NthRoot
huffman
parents: 20515
diff changeset
   569
22443
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   570
lemma sqrt_divide_self_eq:
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   571
  assumes nneg: "0 \<le> x"
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   572
  shows "sqrt x / x = inverse (sqrt x)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   573
proof (cases "x = 0")
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   574
  case True
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   575
  then show ?thesis by simp
22443
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   576
next
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   577
  case False
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   578
  then have pos: "0 < x"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   579
    using nneg by arith
22443
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   580
  show ?thesis
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   581
  proof (rule right_inverse_eq [THEN iffD1, symmetric])
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   582
    show "sqrt x / x \<noteq> 0"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   583
      by (simp add: divide_inverse nneg False)
22443
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   584
    show "inverse (sqrt x) / (sqrt x / x) = 1"
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   585
      by (simp add: divide_inverse mult.assoc [symmetric]
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   586
          power2_eq_square [symmetric] real_inv_sqrt_pow2 pos False)
22443
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   587
  qed
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   588
qed
346729a55460 move sqrt_divide_self_eq to NthRoot.thy
huffman
parents: 21865
diff changeset
   589
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   590
lemma real_div_sqrt: "0 \<le> x \<Longrightarrow> x / sqrt x = sqrt x"
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   591
  by (cases "x = 0") (simp_all add: sqrt_divide_self_eq [of x] field_simps)
54413
88a036a95967 add finite_select_induct; move generic lemmas from MV_Analysis/Linear_Algebra to the HOL image
hoelzl
parents: 53594
diff changeset
   592
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   593
lemma real_divide_square_eq [simp]: "(r * a) / (r * r) = a / r"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   594
  for a r :: real
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   595
  by (cases "r = 0") (simp_all add: divide_inverse ac_simps)
22721
d9be18bd7a28 moved root and sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 22630
diff changeset
   596
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   597
lemma lemma_real_divide_sqrt_less: "0 < u \<Longrightarrow> u / sqrt 2 < u"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   598
  by (simp add: divide_less_eq)
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   599
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   600
lemma four_x_squared: "4 * x\<^sup>2 = (2 * x)\<^sup>2"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   601
  for x :: real
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   602
  by (simp add: power2_eq_square)
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   603
57275
0ddb5b755cdc moved lemmas from the proof of the Central Limit Theorem by Jeremy Avigad and Luke Serafin
hoelzl
parents: 57155
diff changeset
   604
lemma sqrt_at_top: "LIM x at_top. sqrt x :: real :> at_top"
0ddb5b755cdc moved lemmas from the proof of the Central Limit Theorem by Jeremy Avigad and Luke Serafin
hoelzl
parents: 57155
diff changeset
   605
  by (rule filterlim_at_top_at_top[where Q="\<lambda>x. True" and P="\<lambda>x. 0 < x" and g="power2"])
0ddb5b755cdc moved lemmas from the proof of the Central Limit Theorem by Jeremy Avigad and Luke Serafin
hoelzl
parents: 57155
diff changeset
   606
     (auto intro: eventually_gt_at_top)
0ddb5b755cdc moved lemmas from the proof of the Central Limit Theorem by Jeremy Avigad and Luke Serafin
hoelzl
parents: 57155
diff changeset
   607
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   608
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   609
subsection \<open>Square Root of Sum of Squares\<close>
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   610
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   611
lemma sum_squares_bound: "2 * x * y \<le> x\<^sup>2 + y\<^sup>2"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   612
  for x y :: "'a::linordered_field"
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   613
proof -
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   614
  have "(x - y)\<^sup>2 = x * x - 2 * x * y + y * y"
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   615
    by algebra
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   616
  then have "0 \<le> x\<^sup>2 - 2 * x * y + y\<^sup>2"
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   617
    by (metis sum_power2_ge_zero zero_le_double_add_iff_zero_le_single_add power2_eq_square)
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   618
  then show ?thesis
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   619
    by arith
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   620
qed
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   621
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   622
lemma arith_geo_mean:
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   623
  fixes u :: "'a::linordered_field"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   624
  assumes "u\<^sup>2 = x * y" "x \<ge> 0" "y \<ge> 0"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   625
  shows "u \<le> (x + y)/2"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   626
  apply (rule power2_le_imp_le)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   627
  using sum_squares_bound assms
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   628
  apply (auto simp: zero_le_mult_iff)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   629
  apply (auto simp: algebra_simps power2_eq_square)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   630
  done
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   631
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   632
lemma arith_geo_mean_sqrt:
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   633
  fixes x :: real
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   634
  assumes "x \<ge> 0" "y \<ge> 0"
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   635
  shows "sqrt (x * y) \<le> (x + y)/2"
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   636
  apply (rule arith_geo_mean)
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   637
  using assms
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   638
  apply (auto simp: zero_le_mult_iff)
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   639
  done
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   640
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   641
lemma real_sqrt_sum_squares_mult_ge_zero [simp]: "0 \<le> sqrt ((x\<^sup>2 + y\<^sup>2) * (xa\<^sup>2 + ya\<^sup>2))"
55967
5dadc93ff3df a few new lemmas
paulson <lp15@cam.ac.uk>
parents: 54413
diff changeset
   642
  by (metis real_sqrt_ge_0_iff split_mult_pos_le sum_power2_ge_zero)
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   643
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   644
lemma real_sqrt_sum_squares_mult_squared_eq [simp]:
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   645
  "(sqrt ((x\<^sup>2 + y\<^sup>2) * (xa\<^sup>2 + ya\<^sup>2)))\<^sup>2 = (x\<^sup>2 + y\<^sup>2) * (xa\<^sup>2 + ya\<^sup>2)"
44320
33439faadd67 remove some redundant simp rules about sqrt
huffman
parents: 44289
diff changeset
   646
  by (simp add: zero_le_mult_iff)
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   647
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   648
lemma real_sqrt_sum_squares_eq_cancel: "sqrt (x\<^sup>2 + y\<^sup>2) = x \<Longrightarrow> y = 0"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   649
  by (drule arg_cong [where f = "\<lambda>x. x\<^sup>2"]) simp
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   650
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   651
lemma real_sqrt_sum_squares_eq_cancel2: "sqrt (x\<^sup>2 + y\<^sup>2) = y \<Longrightarrow> x = 0"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   652
  by (drule arg_cong [where f = "\<lambda>x. x\<^sup>2"]) simp
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   653
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   654
lemma real_sqrt_sum_squares_ge1 [simp]: "x \<le> sqrt (x\<^sup>2 + y\<^sup>2)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   655
  by (rule power2_le_imp_le) simp_all
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   656
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   657
lemma real_sqrt_sum_squares_ge2 [simp]: "y \<le> sqrt (x\<^sup>2 + y\<^sup>2)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   658
  by (rule power2_le_imp_le) simp_all
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   659
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   660
lemma real_sqrt_ge_abs1 [simp]: "\<bar>x\<bar> \<le> sqrt (x\<^sup>2 + y\<^sup>2)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   661
  by (rule power2_le_imp_le) simp_all
22856
eb0e0582092a cleaned up
huffman
parents: 22721
diff changeset
   662
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   663
lemma real_sqrt_ge_abs2 [simp]: "\<bar>y\<bar> \<le> sqrt (x\<^sup>2 + y\<^sup>2)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   664
  by (rule power2_le_imp_le) simp_all
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   665
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   666
lemma le_real_sqrt_sumsq [simp]: "x \<le> sqrt (x * x + y * y)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   667
  by (simp add: power2_eq_square [symmetric])
23049
11607c283074 moved sqrt lemmas from Transcendental.thy to NthRoot.thy
huffman
parents: 23047
diff changeset
   668
67685
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   669
lemma sqrt_sum_squares_le_sum:
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   670
  "\<lbrakk>0 \<le> x; 0 \<le> y\<rbrakk> \<Longrightarrow> sqrt (x\<^sup>2 + y\<^sup>2) \<le> x + y"
68465
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   671
  by (rule power2_le_imp_le) (simp_all add: power2_sum)
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   672
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   673
lemma L2_set_mult_ineq_lemma:
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   674
  fixes a b c d :: real
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   675
  shows "2 * (a * c) * (b * d) \<le> a\<^sup>2 * d\<^sup>2 + b\<^sup>2 * c\<^sup>2"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   676
proof -
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   677
  have "0 \<le> (a * d - b * c)\<^sup>2" by simp
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   678
  also have "\<dots> = a\<^sup>2 * d\<^sup>2 + b\<^sup>2 * c\<^sup>2 - 2 * (a * d) * (b * c)"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   679
    by (simp only: power2_diff power_mult_distrib)
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   680
  also have "\<dots> = a\<^sup>2 * d\<^sup>2 + b\<^sup>2 * c\<^sup>2 - 2 * (a * c) * (b * d)"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   681
    by simp
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   682
  finally show "2 * (a * c) * (b * d) \<le> a\<^sup>2 * d\<^sup>2 + b\<^sup>2 * c\<^sup>2"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   683
    by simp
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   684
qed
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   685
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   686
lemma sqrt_sum_squares_le_sum_abs: "sqrt (x\<^sup>2 + y\<^sup>2) \<le> \<bar>x\<bar> + \<bar>y\<bar>"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   687
  by (rule power2_le_imp_le) (simp_all add: power2_sum)
67685
bdff8bf0a75b moved theorems from AFP/Affine_Arithmetic and AFP/Ordinary_Differential_Equations
immler
parents: 66815
diff changeset
   688
22858
5ca5d1cce388 add lemma real_sqrt_sum_squares_triangle_ineq
huffman
parents: 22856
diff changeset
   689
lemma real_sqrt_sum_squares_triangle_ineq:
53015
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find;
wenzelm
parents: 51483
diff changeset
   690
  "sqrt ((a + c)\<^sup>2 + (b + d)\<^sup>2) \<le> sqrt (a\<^sup>2 + b\<^sup>2) + sqrt (c\<^sup>2 + d\<^sup>2)"
68465
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   691
proof -
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   692
  have "(a * c + b * d) \<le> (sqrt (a\<^sup>2 + b\<^sup>2) * sqrt (c\<^sup>2 + d\<^sup>2))"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   693
    by (rule power2_le_imp_le) (simp_all add: power2_sum power_mult_distrib ring_distribs L2_set_mult_ineq_lemma add.commute)
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   694
  then have "(a + c)\<^sup>2 + (b + d)\<^sup>2 \<le> (sqrt (a\<^sup>2 + b\<^sup>2) + sqrt (c\<^sup>2 + d\<^sup>2))\<^sup>2"
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   695
    by (simp add: power2_sum)
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   696
  then show ?thesis
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   697
    by (auto intro: power2_le_imp_le)
e699ca8e22b7 New material in support of quaternions
paulson <lp15@cam.ac.uk>
parents: 68077
diff changeset
   698
qed
22858
5ca5d1cce388 add lemma real_sqrt_sum_squares_triangle_ineq
huffman
parents: 22856
diff changeset
   699
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   700
lemma real_sqrt_sum_squares_less: "\<bar>x\<bar> < u / sqrt 2 \<Longrightarrow> \<bar>y\<bar> < u / sqrt 2 \<Longrightarrow> sqrt (x\<^sup>2 + y\<^sup>2) < u"
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   701
  apply (rule power2_less_imp_less)
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   702
   apply simp
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   703
   apply (drule power_strict_mono [OF _ abs_ge_zero pos2])
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   704
   apply (drule power_strict_mono [OF _ abs_ge_zero pos2])
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   705
   apply (simp add: power_divide)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   706
  apply (drule order_le_less_trans [OF abs_ge_zero])
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   707
  apply (simp add: zero_less_divide_iff)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   708
  done
23122
3d853d6f2f7d add lemma real_sqrt_sum_squares_less
huffman
parents: 23069
diff changeset
   709
59741
5b762cd73a8e Lots of new material on complex-valued functions. Modified simplification of (x/n)^k
paulson <lp15@cam.ac.uk>
parents: 58889
diff changeset
   710
lemma sqrt2_less_2: "sqrt 2 < (2::real)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   711
  by (metis not_less not_less_iff_gr_or_eq numeral_less_iff real_sqrt_four
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   712
      real_sqrt_le_iff semiring_norm(75) semiring_norm(78) semiring_norm(85))
59741
5b762cd73a8e Lots of new material on complex-valued functions. Modified simplification of (x/n)^k
paulson <lp15@cam.ac.uk>
parents: 58889
diff changeset
   713
64122
74fde524799e invariance of domain
paulson <lp15@cam.ac.uk>
parents: 63721
diff changeset
   714
lemma sqrt_sum_squares_half_less:
74fde524799e invariance of domain
paulson <lp15@cam.ac.uk>
parents: 63721
diff changeset
   715
  "x < u/2 \<Longrightarrow> y < u/2 \<Longrightarrow> 0 \<le> x \<Longrightarrow> 0 \<le> y \<Longrightarrow> sqrt (x\<^sup>2 + y\<^sup>2) < u"
59741
5b762cd73a8e Lots of new material on complex-valued functions. Modified simplification of (x/n)^k
paulson <lp15@cam.ac.uk>
parents: 58889
diff changeset
   716
  apply (rule real_sqrt_sum_squares_less)
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   717
   apply (auto simp add: abs_if field_simps)
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   718
   apply (rule le_less_trans [where y = "x*2"])
64122
74fde524799e invariance of domain
paulson <lp15@cam.ac.uk>
parents: 63721
diff changeset
   719
  using less_eq_real_def sqrt2_less_2 apply force
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   720
   apply assumption
59741
5b762cd73a8e Lots of new material on complex-valued functions. Modified simplification of (x/n)^k
paulson <lp15@cam.ac.uk>
parents: 58889
diff changeset
   721
  apply (rule le_less_trans [where y = "y*2"])
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   722
  using less_eq_real_def sqrt2_less_2 mult_le_cancel_left
63558
0aa33085c8b1 misc tuning and modernization;
wenzelm
parents: 63467
diff changeset
   723
   apply auto
59741
5b762cd73a8e Lots of new material on complex-valued functions. Modified simplification of (x/n)^k
paulson <lp15@cam.ac.uk>
parents: 58889
diff changeset
   724
  done
61609
77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed.
paulson <lp15@cam.ac.uk>
parents: 60867
diff changeset
   725
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   726
lemma LIMSEQ_root: "(\<lambda>n. root n n) \<longlonglongrightarrow> 1"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   727
proof -
63040
eb4ddd18d635 eliminated old 'def';
wenzelm
parents: 62393
diff changeset
   728
  define x where "x n = root n n - 1" for n
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   729
  have "x \<longlonglongrightarrow> sqrt 0"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   730
  proof (rule tendsto_sandwich[OF _ _ tendsto_const])
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   731
    show "(\<lambda>x. sqrt (2 / x)) \<longlonglongrightarrow> sqrt 0"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   732
      by (intro tendsto_intros tendsto_divide_0[OF tendsto_const] filterlim_mono[OF filterlim_real_sequentially])
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   733
         (simp_all add: at_infinity_eq_at_top_bot)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   734
    have "x n \<le> sqrt (2 / real n)" if "2 < n" for n :: nat
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   735
    proof -
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   736
      have "1 + (real (n - 1) * n) / 2 * (x n)\<^sup>2 = 1 + of_nat (n choose 2) * (x n)\<^sup>2"
66815
93c6632ddf44 one uniform type class for parity structures
haftmann
parents: 65552
diff changeset
   737
        by (auto simp add: choose_two field_char_0_class.of_nat_div mod_eq_0_iff_dvd)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   738
      also have "\<dots> \<le> (\<Sum>k\<in>{0, 2}. of_nat (n choose k) * x n^k)"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   739
        by (simp add: x_def)
68077
ee8c13ae81e9 Some tidying up (mostly regarding summations from 0)
paulson <lp15@cam.ac.uk>
parents: 67685
diff changeset
   740
      also have "\<dots> \<le> (\<Sum>k\<le>n. of_nat (n choose k) * x n^k)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   741
        using \<open>2 < n\<close>
64267
b9a1486e79be setsum -> sum
nipkow
parents: 64122
diff changeset
   742
        by (intro sum_mono2) (auto intro!: mult_nonneg_nonneg zero_le_power simp: x_def le_diff_eq)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   743
      also have "\<dots> = (x n + 1) ^ n"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   744
        by (simp add: binomial_ring)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   745
      also have "\<dots> = n"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   746
        using \<open>2 < n\<close> by (simp add: x_def)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   747
      finally have "real (n - 1) * (real n / 2 * (x n)\<^sup>2) \<le> real (n - 1) * 1"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   748
        by simp
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   749
      then have "(x n)\<^sup>2 \<le> 2 / real n"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   750
        using \<open>2 < n\<close> unfolding mult_le_cancel_left by (simp add: field_simps)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   751
      from real_sqrt_le_mono[OF this] show ?thesis
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   752
        by simp
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   753
    qed
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   754
    then show "eventually (\<lambda>n. x n \<le> sqrt (2 / real n)) sequentially"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   755
      by (auto intro!: exI[of _ 3] simp: eventually_sequentially)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   756
    show "eventually (\<lambda>n. sqrt 0 \<le> x n) sequentially"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   757
      by (auto intro!: exI[of _ 1] simp: eventually_sequentially le_diff_eq x_def)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   758
  qed
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   759
  from tendsto_add[OF this tendsto_const[of 1]] show ?thesis
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   760
    by (simp add: x_def)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   761
qed
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   762
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   763
lemma LIMSEQ_root_const:
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   764
  assumes "0 < c"
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   765
  shows "(\<lambda>n. root n c) \<longlonglongrightarrow> 1"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   766
proof -
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   767
  have ge_1: "(\<lambda>n. root n c) \<longlonglongrightarrow> 1" if "1 \<le> c" for c :: real
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   768
  proof -
63040
eb4ddd18d635 eliminated old 'def';
wenzelm
parents: 62393
diff changeset
   769
    define x where "x n = root n c - 1" for n
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   770
    have "x \<longlonglongrightarrow> 0"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   771
    proof (rule tendsto_sandwich[OF _ _ tendsto_const])
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   772
      show "(\<lambda>n. c / n) \<longlonglongrightarrow> 0"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   773
        by (intro tendsto_divide_0[OF tendsto_const] filterlim_mono[OF filterlim_real_sequentially])
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   774
          (simp_all add: at_infinity_eq_at_top_bot)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   775
      have "x n \<le> c / n" if "1 < n" for n :: nat
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   776
      proof -
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   777
        have "1 + x n * n = 1 + of_nat (n choose 1) * x n^1"
63417
c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat
haftmann
parents: 63367
diff changeset
   778
          by (simp add: choose_one)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   779
        also have "\<dots> \<le> (\<Sum>k\<in>{0, 1}. of_nat (n choose k) * x n^k)"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   780
          by (simp add: x_def)
68077
ee8c13ae81e9 Some tidying up (mostly regarding summations from 0)
paulson <lp15@cam.ac.uk>
parents: 67685
diff changeset
   781
        also have "\<dots> \<le> (\<Sum>k\<le>n. of_nat (n choose k) * x n^k)"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   782
          using \<open>1 < n\<close> \<open>1 \<le> c\<close>
64267
b9a1486e79be setsum -> sum
nipkow
parents: 64122
diff changeset
   783
          by (intro sum_mono2)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   784
            (auto intro!: mult_nonneg_nonneg zero_le_power simp: x_def le_diff_eq)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   785
        also have "\<dots> = (x n + 1) ^ n"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   786
          by (simp add: binomial_ring)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   787
        also have "\<dots> = c"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   788
          using \<open>1 < n\<close> \<open>1 \<le> c\<close> by (simp add: x_def)
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   789
        finally show ?thesis
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   790
          using \<open>1 \<le> c\<close> \<open>1 < n\<close> by (simp add: field_simps)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   791
      qed
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   792
      then show "eventually (\<lambda>n. x n \<le> c / n) sequentially"
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   793
        by (auto intro!: exI[of _ 3] simp: eventually_sequentially)
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   794
      show "eventually (\<lambda>n. 0 \<le> x n) sequentially"
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   795
        using \<open>1 \<le> c\<close>
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   796
        by (auto intro!: exI[of _ 1] simp: eventually_sequentially le_diff_eq x_def)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   797
    qed
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   798
    from tendsto_add[OF this tendsto_const[of 1]] show ?thesis
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   799
      by (simp add: x_def)
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   800
  qed
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   801
  show ?thesis
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   802
  proof (cases "1 \<le> c")
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   803
    case True
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   804
    with ge_1 show ?thesis by blast
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   805
  next
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   806
    case False
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   807
    with \<open>0 < c\<close> have "1 \<le> 1 / c"
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   808
      by simp
61969
e01015e49041 more symbols;
wenzelm
parents: 61944
diff changeset
   809
    then have "(\<lambda>n. 1 / root n (1 / c)) \<longlonglongrightarrow> 1 / 1"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60615
diff changeset
   810
      by (intro tendsto_divide tendsto_const ge_1 \<open>1 \<le> 1 / c\<close> one_neq_zero)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   811
    then show ?thesis
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   812
      by (rule filterlim_cong[THEN iffD1, rotated 3])
63467
f3781c5fb03f misc tuning and modernization;
wenzelm
parents: 63417
diff changeset
   813
        (auto intro!: exI[of _ 1] simp: eventually_sequentially real_root_divide)
60141
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   814
  qed
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   815
qed
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   816
833adf7db7d8 New material, mostly about limits. Consolidation.
paulson <lp15@cam.ac.uk>
parents: 59741
diff changeset
   817
22956
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   818
text "Legacy theorem names:"
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   819
lemmas real_root_pos2 = real_root_power_cancel
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   820
lemmas real_root_pos_pos = real_root_gt_zero [THEN order_less_imp_le]
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   821
lemmas real_root_pos_pos_le = real_root_ge_zero
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   822
lemmas real_sqrt_eq_zero_cancel_iff = real_sqrt_eq_0_iff
617140080e6a define roots of negative reals so that many lemmas no longer require side conditions; simplification solves more goals than previously
huffman
parents: 22943
diff changeset
   823
14324
c9c6832f9b22 converting Hyperreal/NthRoot to Isar
paulson
parents: 14268
diff changeset
   824
end