| author | haftmann |
| Tue, 08 Aug 2006 08:19:44 +0200 | |
| changeset 20355 | 50aaae6ae4db |
| parent 17149 | e2b19c92ef51 |
| child 21199 | 2d83f93c3580 |
| permissions | -rw-r--r-- |
|
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New theory "Power" of exponentiation (and binomial coefficients)
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(* Title: HOL/Power.thy |
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0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
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ID: $Id$ |
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0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory |
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New theory "Power" of exponentiation (and binomial coefficients)
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Copyright 1997 University of Cambridge |
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New theory "Power" of exponentiation (and binomial coefficients)
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New theory "Power" of exponentiation (and binomial coefficients)
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*) |
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linear arithmetic now takes "&" in assumptions apart.
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header{*Exponentiation*}
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theory Power |
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imports Divides |
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begin |
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subsection{*Powers for Arbitrary Semirings*}
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axclass recpower \<subseteq> comm_semiring_1_cancel, power |
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power_0 [simp]: "a ^ 0 = 1" |
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power_Suc: "a ^ (Suc n) = a * (a ^ n)" |
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lemma power_0_Suc [simp]: "(0::'a::recpower) ^ (Suc n) = 0" |
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by (simp add: power_Suc) |
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text{*It looks plausible as a simprule, but its effect can be strange.*}
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lemma power_0_left: "0^n = (if n=0 then 1 else (0::'a::recpower))" |
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by (induct "n", auto) |
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lemma power_one [simp]: "1^n = (1::'a::recpower)" |
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apply (induct "n") |
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apply (auto simp add: power_Suc) |
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done |
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lemma power_one_right [simp]: "(a::'a::recpower) ^ 1 = a" |
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by (simp add: power_Suc) |
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lemma power_add: "(a::'a::recpower) ^ (m+n) = (a^m) * (a^n)" |
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apply (induct "n") |
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apply (simp_all add: power_Suc mult_ac) |
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done |
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lemma power_mult: "(a::'a::recpower) ^ (m*n) = (a^m) ^ n" |
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apply (induct "n") |
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apply (simp_all add: power_Suc power_add) |
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done |
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lemma power_mult_distrib: "((a::'a::recpower) * b) ^ n = (a^n) * (b^n)" |
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apply (induct "n") |
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apply (auto simp add: power_Suc mult_ac) |
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done |
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lemma zero_less_power: |
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"0 < (a::'a::{ordered_semidom,recpower}) ==> 0 < a^n"
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apply (induct "n") |
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apply (simp_all add: power_Suc zero_less_one mult_pos_pos) |
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done |
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lemma zero_le_power: |
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"0 \<le> (a::'a::{ordered_semidom,recpower}) ==> 0 \<le> a^n"
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apply (simp add: order_le_less) |
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apply (erule disjE) |
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apply (simp_all add: zero_less_power zero_less_one power_0_left) |
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done |
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lemma one_le_power: |
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"1 \<le> (a::'a::{ordered_semidom,recpower}) ==> 1 \<le> a^n"
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apply (induct "n") |
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apply (simp_all add: power_Suc) |
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apply (rule order_trans [OF _ mult_mono [of 1 _ 1]]) |
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apply (simp_all add: zero_le_one order_trans [OF zero_le_one]) |
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done |
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lemma gt1_imp_ge0: "1 < a ==> 0 \<le> (a::'a::ordered_semidom)" |
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by (simp add: order_trans [OF zero_le_one order_less_imp_le]) |
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lemma power_gt1_lemma: |
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assumes gt1: "1 < (a::'a::{ordered_semidom,recpower})"
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shows "1 < a * a^n" |
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proof - |
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have "1*1 < a*1" using gt1 by simp |
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also have "\<dots> \<le> a * a^n" using gt1 |
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by (simp only: mult_mono gt1_imp_ge0 one_le_power order_less_imp_le |
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zero_le_one order_refl) |
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finally show ?thesis by simp |
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qed |
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lemma power_gt1: |
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"1 < (a::'a::{ordered_semidom,recpower}) ==> 1 < a ^ (Suc n)"
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by (simp add: power_gt1_lemma power_Suc) |
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lemma power_le_imp_le_exp: |
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assumes gt1: "(1::'a::{recpower,ordered_semidom}) < a"
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shows "!!n. a^m \<le> a^n ==> m \<le> n" |
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proof (induct m) |
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case 0 |
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show ?case by simp |
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next |
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case (Suc m) |
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show ?case |
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proof (cases n) |
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case 0 |
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from prems have "a * a^m \<le> 1" by (simp add: power_Suc) |
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with gt1 show ?thesis |
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by (force simp only: power_gt1_lemma |
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linorder_not_less [symmetric]) |
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next |
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case (Suc n) |
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from prems show ?thesis |
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by (force dest: mult_left_le_imp_le |
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simp add: power_Suc order_less_trans [OF zero_less_one gt1]) |
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qed |
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qed |
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text{*Surely we can strengthen this? It holds for @{text "0<a<1"} too.*}
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lemma power_inject_exp [simp]: |
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"1 < (a::'a::{ordered_semidom,recpower}) ==> (a^m = a^n) = (m=n)"
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by (force simp add: order_antisym power_le_imp_le_exp) |
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text{*Can relax the first premise to @{term "0<a"} in the case of the
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natural numbers.*} |
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lemma power_less_imp_less_exp: |
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"[| (1::'a::{recpower,ordered_semidom}) < a; a^m < a^n |] ==> m < n"
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by (simp add: order_less_le [of m n] order_less_le [of "a^m" "a^n"] |
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power_le_imp_le_exp) |
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lemma power_mono: |
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"[|a \<le> b; (0::'a::{recpower,ordered_semidom}) \<le> a|] ==> a^n \<le> b^n"
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apply (induct "n") |
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apply (simp_all add: power_Suc) |
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apply (auto intro: mult_mono zero_le_power order_trans [of 0 a b]) |
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done |
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lemma power_strict_mono [rule_format]: |
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"[|a < b; (0::'a::{recpower,ordered_semidom}) \<le> a|]
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==> 0 < n --> a^n < b^n" |
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apply (induct "n") |
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apply (auto simp add: mult_strict_mono zero_le_power power_Suc |
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order_le_less_trans [of 0 a b]) |
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done |
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lemma power_eq_0_iff [simp]: |
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"(a^n = 0) = (a = (0::'a::{ordered_idom,recpower}) & 0<n)"
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apply (induct "n") |
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apply (auto simp add: power_Suc zero_neq_one [THEN not_sym]) |
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done |
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lemma field_power_eq_0_iff [simp]: |
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"(a^n = 0) = (a = (0::'a::{field,recpower}) & 0<n)"
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apply (induct "n") |
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apply (auto simp add: power_Suc field_mult_eq_0_iff zero_neq_one[THEN not_sym]) |
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done |
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lemma field_power_not_zero: "a \<noteq> (0::'a::{field,recpower}) ==> a^n \<noteq> 0"
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by force |
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lemma nonzero_power_inverse: |
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"a \<noteq> 0 ==> inverse ((a::'a::{field,recpower}) ^ n) = (inverse a) ^ n"
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apply (induct "n") |
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apply (auto simp add: power_Suc nonzero_inverse_mult_distrib mult_commute) |
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done |
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text{*Perhaps these should be simprules.*}
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lemma power_inverse: |
| 15004 | 163 |
"inverse ((a::'a::{field,division_by_zero,recpower}) ^ n) = (inverse a) ^ n"
|
| 15251 | 164 |
apply (induct "n") |
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apply (auto simp add: power_Suc inverse_mult_distrib) |
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166 |
done |
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167 |
|
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lemma power_one_over: "1 / (a::'a::{field,division_by_zero,recpower})^n =
|
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(1 / a)^n" |
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apply (simp add: divide_inverse) |
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apply (rule power_inverse) |
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172 |
done |
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173 |
|
| 14577 | 174 |
lemma nonzero_power_divide: |
| 15004 | 175 |
"b \<noteq> 0 ==> (a/b) ^ n = ((a::'a::{field,recpower}) ^ n) / (b ^ n)"
|
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by (simp add: divide_inverse power_mult_distrib nonzero_power_inverse) |
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177 |
|
| 14577 | 178 |
lemma power_divide: |
| 15004 | 179 |
"(a/b) ^ n = ((a::'a::{field,division_by_zero,recpower}) ^ n / b ^ n)"
|
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apply (case_tac "b=0", simp add: power_0_left) |
| 14577 | 181 |
apply (rule nonzero_power_divide) |
182 |
apply assumption |
|
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183 |
done |
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184 |
|
| 15004 | 185 |
lemma power_abs: "abs(a ^ n) = abs(a::'a::{ordered_idom,recpower}) ^ n"
|
| 15251 | 186 |
apply (induct "n") |
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apply (auto simp add: power_Suc abs_mult) |
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188 |
done |
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189 |
|
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lemma zero_less_power_abs_iff [simp]: |
| 15004 | 191 |
"(0 < (abs a)^n) = (a \<noteq> (0::'a::{ordered_idom,recpower}) | n=0)"
|
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proof (induct "n") |
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case 0 |
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show ?case by (simp add: zero_less_one) |
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next |
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case (Suc n) |
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show ?case by (force simp add: prems power_Suc zero_less_mult_iff) |
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198 |
qed |
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199 |
|
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200 |
lemma zero_le_power_abs [simp]: |
| 15004 | 201 |
"(0::'a::{ordered_idom,recpower}) \<le> (abs a)^n"
|
| 15251 | 202 |
apply (induct "n") |
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203 |
apply (auto simp add: zero_le_one zero_le_power) |
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204 |
done |
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205 |
|
| 15004 | 206 |
lemma power_minus: "(-a) ^ n = (- 1)^n * (a::'a::{comm_ring_1,recpower}) ^ n"
|
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207 |
proof - |
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have "-a = (- 1) * a" by (simp add: minus_mult_left [symmetric]) |
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thus ?thesis by (simp only: power_mult_distrib) |
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210 |
qed |
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211 |
|
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text{*Lemma for @{text power_strict_decreasing}*}
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lemma power_Suc_less: |
| 15004 | 214 |
"[|(0::'a::{ordered_semidom,recpower}) < a; a < 1|]
|
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==> a * a^n < a^n" |
| 15251 | 216 |
apply (induct n) |
| 14577 | 217 |
apply (auto simp add: power_Suc mult_strict_left_mono) |
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218 |
done |
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219 |
|
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220 |
lemma power_strict_decreasing: |
| 15004 | 221 |
"[|n < N; 0 < a; a < (1::'a::{ordered_semidom,recpower})|]
|
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222 |
==> a^N < a^n" |
| 14577 | 223 |
apply (erule rev_mp) |
| 15251 | 224 |
apply (induct "N") |
| 14577 | 225 |
apply (auto simp add: power_Suc power_Suc_less less_Suc_eq) |
226 |
apply (rename_tac m) |
|
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227 |
apply (subgoal_tac "a * a^m < 1 * a^n", simp) |
| 14577 | 228 |
apply (rule mult_strict_mono) |
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229 |
apply (auto simp add: zero_le_power zero_less_one order_less_imp_le) |
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230 |
done |
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231 |
|
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text{*Proof resembles that of @{text power_strict_decreasing}*}
|
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233 |
lemma power_decreasing: |
| 15004 | 234 |
"[|n \<le> N; 0 \<le> a; a \<le> (1::'a::{ordered_semidom,recpower})|]
|
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235 |
==> a^N \<le> a^n" |
| 14577 | 236 |
apply (erule rev_mp) |
| 15251 | 237 |
apply (induct "N") |
| 14577 | 238 |
apply (auto simp add: power_Suc le_Suc_eq) |
239 |
apply (rename_tac m) |
|
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240 |
apply (subgoal_tac "a * a^m \<le> 1 * a^n", simp) |
| 14577 | 241 |
apply (rule mult_mono) |
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242 |
apply (auto simp add: zero_le_power zero_le_one) |
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243 |
done |
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244 |
|
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245 |
lemma power_Suc_less_one: |
| 15004 | 246 |
"[| 0 < a; a < (1::'a::{ordered_semidom,recpower}) |] ==> a ^ Suc n < 1"
|
| 14577 | 247 |
apply (insert power_strict_decreasing [of 0 "Suc n" a], simp) |
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248 |
done |
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249 |
|
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250 |
text{*Proof again resembles that of @{text power_strict_decreasing}*}
|
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251 |
lemma power_increasing: |
| 15004 | 252 |
"[|n \<le> N; (1::'a::{ordered_semidom,recpower}) \<le> a|] ==> a^n \<le> a^N"
|
| 14577 | 253 |
apply (erule rev_mp) |
| 15251 | 254 |
apply (induct "N") |
| 14577 | 255 |
apply (auto simp add: power_Suc le_Suc_eq) |
|
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256 |
apply (rename_tac m) |
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257 |
apply (subgoal_tac "1 * a^n \<le> a * a^m", simp) |
| 14577 | 258 |
apply (rule mult_mono) |
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259 |
apply (auto simp add: order_trans [OF zero_le_one] zero_le_power) |
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260 |
done |
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261 |
|
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262 |
text{*Lemma for @{text power_strict_increasing}*}
|
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263 |
lemma power_less_power_Suc: |
| 15004 | 264 |
"(1::'a::{ordered_semidom,recpower}) < a ==> a^n < a * a^n"
|
| 15251 | 265 |
apply (induct n) |
| 14577 | 266 |
apply (auto simp add: power_Suc mult_strict_left_mono order_less_trans [OF zero_less_one]) |
|
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267 |
done |
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268 |
|
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269 |
lemma power_strict_increasing: |
| 15004 | 270 |
"[|n < N; (1::'a::{ordered_semidom,recpower}) < a|] ==> a^n < a^N"
|
| 14577 | 271 |
apply (erule rev_mp) |
| 15251 | 272 |
apply (induct "N") |
| 14577 | 273 |
apply (auto simp add: power_less_power_Suc power_Suc less_Suc_eq) |
|
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274 |
apply (rename_tac m) |
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275 |
apply (subgoal_tac "1 * a^n < a * a^m", simp) |
| 14577 | 276 |
apply (rule mult_strict_mono) |
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277 |
apply (auto simp add: order_less_trans [OF zero_less_one] zero_le_power |
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278 |
order_less_imp_le) |
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279 |
done |
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280 |
|
| 15066 | 281 |
lemma power_increasing_iff [simp]: |
282 |
"1 < (b::'a::{ordered_semidom,recpower}) ==> (b ^ x \<le> b ^ y) = (x \<le> y)"
|
|
283 |
by (blast intro: power_le_imp_le_exp power_increasing order_less_imp_le) |
|
284 |
||
285 |
lemma power_strict_increasing_iff [simp]: |
|
286 |
"1 < (b::'a::{ordered_semidom,recpower}) ==> (b ^ x < b ^ y) = (x < y)"
|
|
287 |
by (blast intro: power_less_imp_less_exp power_strict_increasing) |
|
288 |
||
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289 |
lemma power_le_imp_le_base: |
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290 |
assumes le: "a ^ Suc n \<le> b ^ Suc n" |
| 15004 | 291 |
and xnonneg: "(0::'a::{ordered_semidom,recpower}) \<le> a"
|
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292 |
and ynonneg: "0 \<le> b" |
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293 |
shows "a \<le> b" |
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294 |
proof (rule ccontr) |
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295 |
assume "~ a \<le> b" |
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296 |
then have "b < a" by (simp only: linorder_not_le) |
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297 |
then have "b ^ Suc n < a ^ Suc n" |
| 14577 | 298 |
by (simp only: prems power_strict_mono) |
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299 |
from le and this show "False" |
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300 |
by (simp add: linorder_not_less [symmetric]) |
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301 |
qed |
| 14577 | 302 |
|
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303 |
lemma power_inject_base: |
| 14577 | 304 |
"[| a ^ Suc n = b ^ Suc n; 0 \<le> a; 0 \<le> b |] |
| 15004 | 305 |
==> a = (b::'a::{ordered_semidom,recpower})"
|
|
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306 |
by (blast intro: power_le_imp_le_base order_antisym order_eq_refl sym) |
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307 |
|
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308 |
|
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|
309 |
subsection{*Exponentiation for the Natural Numbers*}
|
|
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0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
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310 |
|
| 8844 | 311 |
primrec (power) |
|
3390
0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff
changeset
|
312 |
"p ^ 0 = 1" |
|
0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff
changeset
|
313 |
"p ^ (Suc n) = (p::nat) * (p ^ n)" |
| 14577 | 314 |
|
| 15004 | 315 |
instance nat :: recpower |
|
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Defining the type class "ringpower" and deleting superseded theorems for
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|
316 |
proof |
| 14438 | 317 |
fix z n :: nat |
|
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Defining the type class "ringpower" and deleting superseded theorems for
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|
318 |
show "z^0 = 1" by simp |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
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changeset
|
319 |
show "z^(Suc n) = z * (z^n)" by simp |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
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changeset
|
320 |
qed |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
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parents:
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changeset
|
321 |
|
|
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Defining the type class "ringpower" and deleting superseded theorems for
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|
322 |
lemma nat_one_le_power [simp]: "1 \<le> i ==> Suc 0 \<le> i^n" |
|
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Defining the type class "ringpower" and deleting superseded theorems for
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diff
changeset
|
323 |
by (insert one_le_power [of i n], simp) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
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parents:
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diff
changeset
|
324 |
|
|
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Defining the type class "ringpower" and deleting superseded theorems for
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parents:
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|
325 |
lemma le_imp_power_dvd: "!!i::nat. m \<le> n ==> i^m dvd i^n" |
|
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Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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changeset
|
326 |
apply (unfold dvd_def) |
| 16796 | 327 |
apply (erule linorder_not_less [THEN iffD2, THEN add_diff_inverse, THEN subst]) |
|
14348
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Defining the type class "ringpower" and deleting superseded theorems for
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parents:
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diff
changeset
|
328 |
apply (simp add: power_add) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
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parents:
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diff
changeset
|
329 |
done |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
330 |
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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diff
changeset
|
331 |
text{*Valid for the naturals, but what if @{text"0<i<1"}?
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
332 |
Premises cannot be weakened: consider the case where @{term "i=0"},
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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diff
changeset
|
333 |
@{term "m=1"} and @{term "n=0"}.*}
|
|
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Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
334 |
lemma nat_power_less_imp_less: "!!i::nat. [| 0 < i; i^m < i^n |] ==> m < n" |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
335 |
apply (rule ccontr) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
336 |
apply (drule leI [THEN le_imp_power_dvd, THEN dvd_imp_le, THEN leD]) |
| 14577 | 337 |
apply (erule zero_less_power, auto) |
|
14348
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Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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diff
changeset
|
338 |
done |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
339 |
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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diff
changeset
|
340 |
lemma nat_zero_less_power_iff [simp]: "(0 < x^n) = (x \<noteq> (0::nat) | n=0)" |
| 15251 | 341 |
by (induct "n", auto) |
|
14348
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Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
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diff
changeset
|
342 |
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
343 |
lemma power_le_dvd [rule_format]: "k^j dvd n --> i\<le>j --> k^i dvd (n::nat)" |
| 15251 | 344 |
apply (induct "j") |
|
14348
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
345 |
apply (simp_all add: le_Suc_eq) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
346 |
apply (blast dest!: dvd_mult_right) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
347 |
done |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
348 |
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
349 |
lemma power_dvd_imp_le: "[|i^m dvd i^n; (1::nat) < i|] ==> m \<le> n" |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
350 |
apply (rule power_le_imp_le_exp, assumption) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
351 |
apply (erule dvd_imp_le, simp) |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
352 |
done |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
353 |
|
|
17149
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
354 |
lemma power_diff: |
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
355 |
assumes nz: "a ~= 0" |
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
356 |
shows "n <= m ==> (a::'a::{recpower, field}) ^ (m-n) = (a^m) / (a^n)"
|
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
357 |
by (induct m n rule: diff_induct) |
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
358 |
(simp_all add: power_Suc nonzero_mult_divide_cancel_left nz) |
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
359 |
|
|
e2b19c92ef51
Lemmas on dvd, power and finite summation added or strengthened.
ballarin
parents:
16796
diff
changeset
|
360 |
|
|
14348
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
361 |
text{*ML bindings for the general exponentiation theorems*}
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
362 |
ML |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
363 |
{*
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
364 |
val power_0 = thm"power_0"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
365 |
val power_Suc = thm"power_Suc"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
366 |
val power_0_Suc = thm"power_0_Suc"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
367 |
val power_0_left = thm"power_0_left"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
368 |
val power_one = thm"power_one"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
369 |
val power_one_right = thm"power_one_right"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
370 |
val power_add = thm"power_add"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
371 |
val power_mult = thm"power_mult"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
372 |
val power_mult_distrib = thm"power_mult_distrib"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
373 |
val zero_less_power = thm"zero_less_power"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
374 |
val zero_le_power = thm"zero_le_power"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
375 |
val one_le_power = thm"one_le_power"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
376 |
val gt1_imp_ge0 = thm"gt1_imp_ge0"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
377 |
val power_gt1_lemma = thm"power_gt1_lemma"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
378 |
val power_gt1 = thm"power_gt1"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
379 |
val power_le_imp_le_exp = thm"power_le_imp_le_exp"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
380 |
val power_inject_exp = thm"power_inject_exp"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
381 |
val power_less_imp_less_exp = thm"power_less_imp_less_exp"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
382 |
val power_mono = thm"power_mono"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
383 |
val power_strict_mono = thm"power_strict_mono"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
384 |
val power_eq_0_iff = thm"power_eq_0_iff"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
385 |
val field_power_eq_0_iff = thm"field_power_eq_0_iff"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
386 |
val field_power_not_zero = thm"field_power_not_zero"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
387 |
val power_inverse = thm"power_inverse"; |
|
14353
79f9fbef9106
Added lemmas to Ring_and_Field with slightly modified simplification rules
paulson
parents:
14348
diff
changeset
|
388 |
val nonzero_power_divide = thm"nonzero_power_divide"; |
|
79f9fbef9106
Added lemmas to Ring_and_Field with slightly modified simplification rules
paulson
parents:
14348
diff
changeset
|
389 |
val power_divide = thm"power_divide"; |
|
14348
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
390 |
val power_abs = thm"power_abs"; |
|
14353
79f9fbef9106
Added lemmas to Ring_and_Field with slightly modified simplification rules
paulson
parents:
14348
diff
changeset
|
391 |
val zero_less_power_abs_iff = thm"zero_less_power_abs_iff"; |
|
79f9fbef9106
Added lemmas to Ring_and_Field with slightly modified simplification rules
paulson
parents:
14348
diff
changeset
|
392 |
val zero_le_power_abs = thm "zero_le_power_abs"; |
|
14348
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
393 |
val power_minus = thm"power_minus"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
394 |
val power_Suc_less = thm"power_Suc_less"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
395 |
val power_strict_decreasing = thm"power_strict_decreasing"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
396 |
val power_decreasing = thm"power_decreasing"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
397 |
val power_Suc_less_one = thm"power_Suc_less_one"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
398 |
val power_increasing = thm"power_increasing"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
399 |
val power_strict_increasing = thm"power_strict_increasing"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
400 |
val power_le_imp_le_base = thm"power_le_imp_le_base"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
401 |
val power_inject_base = thm"power_inject_base"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
402 |
*} |
| 14577 | 403 |
|
|
14348
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
404 |
text{*ML bindings for the remaining theorems*}
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
405 |
ML |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
406 |
{*
|
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
407 |
val nat_one_le_power = thm"nat_one_le_power"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
408 |
val le_imp_power_dvd = thm"le_imp_power_dvd"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
409 |
val nat_power_less_imp_less = thm"nat_power_less_imp_less"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
410 |
val nat_zero_less_power_iff = thm"nat_zero_less_power_iff"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
411 |
val power_le_dvd = thm"power_le_dvd"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
412 |
val power_dvd_imp_le = thm"power_dvd_imp_le"; |
|
744c868ee0b7
Defining the type class "ringpower" and deleting superseded theorems for
paulson
parents:
8844
diff
changeset
|
413 |
*} |
|
3390
0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff
changeset
|
414 |
|
|
0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff
changeset
|
415 |
end |
|
0c7625196d95
New theory "Power" of exponentiation (and binomial coefficients)
paulson
parents:
diff
changeset
|
416 |