src/HOL/Binomial.thy

--- a/src/HOL/Binomial.thy	Thu May 11 16:47:53 2017 +0200
+++ b/src/HOL/Binomial.thy	Fri May 12 07:53:35 2017 +0200
@@ -6,180 +6,12 @@
     Author:     Manuel Eberl
 *)
 
-section \<open>Combinatorial Functions: Factorial Function, Rising Factorials, Binomial Coefficients and Binomial Theorem\<close>
+section \<open>Binomial Coefficients and Binomial Theorem\<close>
 
 theory Binomial
-  imports Pre_Main
-begin
-
-subsection \<open>Factorial\<close>
-
-context semiring_char_0
-begin
-
-definition fact :: "nat \<Rightarrow> 'a"
-  where fact_prod: "fact n = of_nat (\<Prod>{1..n})"
-
-lemma fact_prod_Suc: "fact n = of_nat (prod Suc {0..<n})"
-  by (cases n)
-    (simp_all add: fact_prod prod.atLeast_Suc_atMost_Suc_shift
-      atLeastLessThanSuc_atLeastAtMost)
-
-lemma fact_prod_rev: "fact n = of_nat (\<Prod>i = 0..<n. n - i)"
-  using prod.atLeast_atMost_rev [of "\<lambda>i. i" 1 n]
-  by (cases n)
-    (simp_all add: fact_prod_Suc prod.atLeast_Suc_atMost_Suc_shift
-      atLeastLessThanSuc_atLeastAtMost)
-
-lemma fact_0 [simp]: "fact 0 = 1"
-  by (simp add: fact_prod)
-
-lemma fact_1 [simp]: "fact 1 = 1"
-  by (simp add: fact_prod)
-
-lemma fact_Suc_0 [simp]: "fact (Suc 0) = 1"
-  by (simp add: fact_prod)
-
-lemma fact_Suc [simp]: "fact (Suc n) = of_nat (Suc n) * fact n"
-  by (simp add: fact_prod atLeastAtMostSuc_conv algebra_simps)
-
-lemma fact_2 [simp]: "fact 2 = 2"
-  by (simp add: numeral_2_eq_2)
-
-lemma fact_split: "k \<le> n \<Longrightarrow> fact n = of_nat (prod Suc {n - k..<n}) * fact (n - k)"
-  by (simp add: fact_prod_Suc prod.union_disjoint [symmetric]
-    ivl_disj_un ac_simps of_nat_mult [symmetric])
-
-end
-
-lemma of_nat_fact [simp]: "of_nat (fact n) = fact n"
-  by (simp add: fact_prod)
-
-lemma of_int_fact [simp]: "of_int (fact n) = fact n"
-  by (simp only: fact_prod of_int_of_nat_eq)
-
-lemma fact_reduce: "n > 0 \<Longrightarrow> fact n = of_nat n * fact (n - 1)"
-  by (cases n) auto
-
-lemma fact_nonzero [simp]: "fact n \<noteq> (0::'a::{semiring_char_0,semiring_no_zero_divisors})"
-  apply (induct n)
-  apply auto
-  using of_nat_eq_0_iff
-  apply fastforce
-  done
-
-lemma fact_mono_nat: "m \<le> n \<Longrightarrow> fact m \<le> (fact n :: nat)"
-  by (induct n) (auto simp: le_Suc_eq)
-
-lemma fact_in_Nats: "fact n \<in> \<nat>"
-  by (induct n) auto
-
-lemma fact_in_Ints: "fact n \<in> \<int>"
-  by (induct n) auto
-
-context
-  assumes "SORT_CONSTRAINT('a::linordered_semidom)"
+  imports Factorial
 begin
 
-lemma fact_mono: "m \<le> n \<Longrightarrow> fact m \<le> (fact n :: 'a)"
-  by (metis of_nat_fact of_nat_le_iff fact_mono_nat)
-
-lemma fact_ge_1 [simp]: "fact n \<ge> (1 :: 'a)"
-  by (metis le0 fact_0 fact_mono)
-
-lemma fact_gt_zero [simp]: "fact n > (0 :: 'a)"
-  using fact_ge_1 less_le_trans zero_less_one by blast
-
-lemma fact_ge_zero [simp]: "fact n \<ge> (0 :: 'a)"
-  by (simp add: less_imp_le)
-
-lemma fact_not_neg [simp]: "\<not> fact n < (0 :: 'a)"
-  by (simp add: not_less_iff_gr_or_eq)
-
-lemma fact_le_power: "fact n \<le> (of_nat (n^n) :: 'a)"
-proof (induct n)
-  case 0
-  then show ?case by simp
-next
-  case (Suc n)
-  then have *: "fact n \<le> (of_nat (Suc n ^ n) ::'a)"
-    by (rule order_trans) (simp add: power_mono del: of_nat_power)
-  have "fact (Suc n) = (of_nat (Suc n) * fact n ::'a)"
-    by (simp add: algebra_simps)
-  also have "\<dots> \<le> of_nat (Suc n) * of_nat (Suc n ^ n)"
-    by (simp add: * ordered_comm_semiring_class.comm_mult_left_mono del: of_nat_power)
-  also have "\<dots> \<le> of_nat (Suc n ^ Suc n)"
-    by (metis of_nat_mult order_refl power_Suc)
-  finally show ?case .
-qed
-
-end
-
-text \<open>Note that @{term "fact 0 = fact 1"}\<close>
-lemma fact_less_mono_nat: "0 < m \<Longrightarrow> m < n \<Longrightarrow> fact m < (fact n :: nat)"
-  by (induct n) (auto simp: less_Suc_eq)
-
-lemma fact_less_mono: "0 < m \<Longrightarrow> m < n \<Longrightarrow> fact m < (fact n :: 'a::linordered_semidom)"
-  by (metis of_nat_fact of_nat_less_iff fact_less_mono_nat)
-
-lemma fact_ge_Suc_0_nat [simp]: "fact n \<ge> Suc 0"
-  by (metis One_nat_def fact_ge_1)
-
-lemma dvd_fact: "1 \<le> m \<Longrightarrow> m \<le> n \<Longrightarrow> m dvd fact n"
-  by (induct n) (auto simp: dvdI le_Suc_eq)
-
-lemma fact_ge_self: "fact n \<ge> n"
-  by (cases "n = 0") (simp_all add: dvd_imp_le dvd_fact)
-
-lemma fact_dvd: "n \<le> m \<Longrightarrow> fact n dvd (fact m :: 'a::{semiring_div,linordered_semidom})"
-  by (induct m) (auto simp: le_Suc_eq)
-
-lemma fact_mod: "m \<le> n \<Longrightarrow> fact n mod (fact m :: 'a::{semiring_div,linordered_semidom}) = 0"
-  by (auto simp add: fact_dvd)
-
-lemma fact_div_fact:
-  assumes "m \<ge> n"
-  shows "fact m div fact n = \<Prod>{n + 1..m}"
-proof -
-  obtain d where "d = m - n"
-    by auto
-  with assms have "m = n + d"
-    by auto
-  have "fact (n + d) div (fact n) = \<Prod>{n + 1..n + d}"
-  proof (induct d)
-    case 0
-    show ?case by simp
-  next
-    case (Suc d')
-    have "fact (n + Suc d') div fact n = Suc (n + d') * fact (n + d') div fact n"
-      by simp
-    also from Suc.hyps have "\<dots> = Suc (n + d') * \<Prod>{n + 1..n + d'}"
-      unfolding div_mult1_eq[of _ "fact (n + d')"] by (simp add: fact_mod)
-    also have "\<dots> = \<Prod>{n + 1..n + Suc d'}"
-      by (simp add: atLeastAtMostSuc_conv)
-    finally show ?case .
-  qed
-  with \<open>m = n + d\<close> show ?thesis by simp
-qed
-
-lemma fact_num_eq_if: "fact m = (if m = 0 then 1 else of_nat m * fact (m - 1))"
-  by (cases m) auto
-
-lemma fact_div_fact_le_pow:
-  assumes "r \<le> n"
-  shows "fact n div fact (n - r) \<le> n ^ r"
-proof -
-  have "r \<le> n \<Longrightarrow> \<Prod>{n - r..n} = (n - r) * \<Prod>{Suc (n - r)..n}" for r
-    by (subst prod.insert[symmetric]) (auto simp: atLeastAtMost_insertL)
-  with assms show ?thesis
-    by (induct r rule: nat.induct) (auto simp add: fact_div_fact Suc_diff_Suc mult_le_mono)
-qed
-
-lemma fact_numeral: "fact (numeral k) = numeral k * fact (pred_numeral k)"
-  \<comment> \<open>Evaluation for specific numerals\<close>
-  by (metis fact_Suc numeral_eq_Suc of_nat_numeral)
-
-
 subsection \<open>Binomial coefficients\<close>
 
 text \<open>This development is based on the work of Andy Gordon and Florian Kammueller.\<close>
@@ -500,208 +332,6 @@
 qed
 
 
-subsection \<open>Pochhammer's symbol: generalized rising factorial\<close>
-
-text \<open>See \<^url>\<open>http://en.wikipedia.org/wiki/Pochhammer_symbol\<close>.\<close>
-
-context comm_semiring_1
-begin
-
-definition pochhammer :: "'a \<Rightarrow> nat \<Rightarrow> 'a"
-  where pochhammer_prod: "pochhammer a n = prod (\<lambda>i. a + of_nat i) {0..<n}"
-
-lemma pochhammer_prod_rev: "pochhammer a n = prod (\<lambda>i. a + of_nat (n - i)) {1..n}"
-  using prod.atLeast_lessThan_rev_at_least_Suc_atMost [of "\<lambda>i. a + of_nat i" 0 n]
-  by (simp add: pochhammer_prod)
-
-lemma pochhammer_Suc_prod: "pochhammer a (Suc n) = prod (\<lambda>i. a + of_nat i) {0..n}"
-  by (simp add: pochhammer_prod atLeastLessThanSuc_atLeastAtMost)
-
-lemma pochhammer_Suc_prod_rev: "pochhammer a (Suc n) = prod (\<lambda>i. a + of_nat (n - i)) {0..n}"
-  by (simp add: pochhammer_prod_rev prod.atLeast_Suc_atMost_Suc_shift)
-
-lemma pochhammer_0 [simp]: "pochhammer a 0 = 1"
-  by (simp add: pochhammer_prod)
-
-lemma pochhammer_1 [simp]: "pochhammer a 1 = a"
-  by (simp add: pochhammer_prod lessThan_Suc)
-
-lemma pochhammer_Suc0 [simp]: "pochhammer a (Suc 0) = a"
-  by (simp add: pochhammer_prod lessThan_Suc)
-
-lemma pochhammer_Suc: "pochhammer a (Suc n) = pochhammer a n * (a + of_nat n)"
-  by (simp add: pochhammer_prod atLeast0_lessThan_Suc ac_simps)
-
-end
-
-lemma pochhammer_nonneg:
-  fixes x :: "'a :: linordered_semidom"
-  shows "x > 0 \<Longrightarrow> pochhammer x n \<ge> 0"
-  by (induction n) (auto simp: pochhammer_Suc intro!: mult_nonneg_nonneg add_nonneg_nonneg)
-
-lemma pochhammer_pos:
-  fixes x :: "'a :: linordered_semidom"
-  shows "x > 0 \<Longrightarrow> pochhammer x n > 0"
-  by (induction n) (auto simp: pochhammer_Suc intro!: mult_pos_pos add_pos_nonneg)
-
-lemma pochhammer_of_nat: "pochhammer (of_nat x) n = of_nat (pochhammer x n)"
-  by (simp add: pochhammer_prod)
-
-lemma pochhammer_of_int: "pochhammer (of_int x) n = of_int (pochhammer x n)"
-  by (simp add: pochhammer_prod)
-
-lemma pochhammer_rec: "pochhammer a (Suc n) = a * pochhammer (a + 1) n"
-  by (simp add: pochhammer_prod prod.atLeast0_lessThan_Suc_shift ac_simps)
-
-lemma pochhammer_rec': "pochhammer z (Suc n) = (z + of_nat n) * pochhammer z n"
-  by (simp add: pochhammer_prod prod.atLeast0_lessThan_Suc ac_simps)
-
-lemma pochhammer_fact: "fact n = pochhammer 1 n"
-  by (simp add: pochhammer_prod fact_prod_Suc)
-
-lemma pochhammer_of_nat_eq_0_lemma: "k > n \<Longrightarrow> pochhammer (- (of_nat n :: 'a:: idom)) k = 0"
-  by (auto simp add: pochhammer_prod)
-
-lemma pochhammer_of_nat_eq_0_lemma':
-  assumes kn: "k \<le> n"
-  shows "pochhammer (- (of_nat n :: 'a::{idom,ring_char_0})) k \<noteq> 0"
-proof (cases k)
-  case 0
-  then show ?thesis by simp
-next
-  case (Suc h)
-  then show ?thesis
-    apply (simp add: pochhammer_Suc_prod)
-    using Suc kn
-    apply (auto simp add: algebra_simps)
-    done
-qed
-
-lemma pochhammer_of_nat_eq_0_iff:
-  "pochhammer (- (of_nat n :: 'a::{idom,ring_char_0})) k = 0 \<longleftrightarrow> k > n"
-  (is "?l = ?r")
-  using pochhammer_of_nat_eq_0_lemma[of n k, where ?'a='a]
-    pochhammer_of_nat_eq_0_lemma'[of k n, where ?'a = 'a]
-  by (auto simp add: not_le[symmetric])
-
-lemma pochhammer_eq_0_iff: "pochhammer a n = (0::'a::field_char_0) \<longleftrightarrow> (\<exists>k < n. a = - of_nat k)"
-  by (auto simp add: pochhammer_prod eq_neg_iff_add_eq_0)
-
-lemma pochhammer_eq_0_mono:
-  "pochhammer a n = (0::'a::field_char_0) \<Longrightarrow> m \<ge> n \<Longrightarrow> pochhammer a m = 0"
-  unfolding pochhammer_eq_0_iff by auto
-
-lemma pochhammer_neq_0_mono:
-  "pochhammer a m \<noteq> (0::'a::field_char_0) \<Longrightarrow> m \<ge> n \<Longrightarrow> pochhammer a n \<noteq> 0"
-  unfolding pochhammer_eq_0_iff by auto
-
-lemma pochhammer_minus:
-  "pochhammer (- b) k = ((- 1) ^ k :: 'a::comm_ring_1) * pochhammer (b - of_nat k + 1) k"
-proof (cases k)
-  case 0
-  then show ?thesis by simp
-next
-  case (Suc h)
-  have eq: "((- 1) ^ Suc h :: 'a) = (\<Prod>i = 0..h. - 1)"
-    using prod_constant [where A="{0.. h}" and y="- 1 :: 'a"]
-    by auto
-  with Suc show ?thesis
-    using pochhammer_Suc_prod_rev [of "b - of_nat k + 1"]
-    by (auto simp add: pochhammer_Suc_prod prod.distrib [symmetric] eq of_nat_diff)
-qed
-
-lemma pochhammer_minus':
-  "pochhammer (b - of_nat k + 1) k = ((- 1) ^ k :: 'a::comm_ring_1) * pochhammer (- b) k"
-  apply (simp only: pochhammer_minus [where b = b])
-  apply (simp only: mult.assoc [symmetric])
-  apply (simp only: power_add [symmetric])
-  apply simp
-  done
-
-lemma pochhammer_same: "pochhammer (- of_nat n) n =
-    ((- 1) ^ n :: 'a::{semiring_char_0,comm_ring_1,semiring_no_zero_divisors}) * fact n"
-  unfolding pochhammer_minus
-  by (simp add: of_nat_diff pochhammer_fact)
-
-lemma pochhammer_product': "pochhammer z (n + m) = pochhammer z n * pochhammer (z + of_nat n) m"
-proof (induct n arbitrary: z)
-  case 0
-  then show ?case by simp
-next
-  case (Suc n z)
-  have "pochhammer z (Suc n) * pochhammer (z + of_nat (Suc n)) m =
-      z * (pochhammer (z + 1) n * pochhammer (z + 1 + of_nat n) m)"
-    by (simp add: pochhammer_rec ac_simps)
-  also note Suc[symmetric]
-  also have "z * pochhammer (z + 1) (n + m) = pochhammer z (Suc (n + m))"
-    by (subst pochhammer_rec) simp
-  finally show ?case
-    by simp
-qed
-
-lemma pochhammer_product:
-  "m \<le> n \<Longrightarrow> pochhammer z n = pochhammer z m * pochhammer (z + of_nat m) (n - m)"
-  using pochhammer_product'[of z m "n - m"] by simp
-
-lemma pochhammer_times_pochhammer_half:
-  fixes z :: "'a::field_char_0"
-  shows "pochhammer z (Suc n) * pochhammer (z + 1/2) (Suc n) = (\<Prod>k=0..2*n+1. z + of_nat k / 2)"
-proof (induct n)
-  case 0
-  then show ?case
-    by (simp add: atLeast0_atMost_Suc)
-next
-  case (Suc n)
-  define n' where "n' = Suc n"
-  have "pochhammer z (Suc n') * pochhammer (z + 1 / 2) (Suc n') =
-      (pochhammer z n' * pochhammer (z + 1 / 2) n') * ((z + of_nat n') * (z + 1/2 + of_nat n'))"
-    (is "_ = _ * ?A")
-    by (simp_all add: pochhammer_rec' mult_ac)
-  also have "?A = (z + of_nat (Suc (2 * n + 1)) / 2) * (z + of_nat (Suc (Suc (2 * n + 1))) / 2)"
-    (is "_ = ?B")
-    by (simp add: field_simps n'_def)
-  also note Suc[folded n'_def]
-  also have "(\<Prod>k=0..2 * n + 1. z + of_nat k / 2) * ?B = (\<Prod>k=0..2 * Suc n + 1. z + of_nat k / 2)"
-    by (simp add: atLeast0_atMost_Suc)
-  finally show ?case
-    by (simp add: n'_def)
-qed
-
-lemma pochhammer_double:
-  fixes z :: "'a::field_char_0"
-  shows "pochhammer (2 * z) (2 * n) = of_nat (2^(2*n)) * pochhammer z n * pochhammer (z+1/2) n"
-proof (induct n)
-  case 0
-  then show ?case by simp
-next
-  case (Suc n)
-  have "pochhammer (2 * z) (2 * (Suc n)) = pochhammer (2 * z) (2 * n) *
-      (2 * (z + of_nat n)) * (2 * (z + of_nat n) + 1)"
-    by (simp add: pochhammer_rec' ac_simps)
-  also note Suc
-  also have "of_nat (2 ^ (2 * n)) * pochhammer z n * pochhammer (z + 1/2) n *
-        (2 * (z + of_nat n)) * (2 * (z + of_nat n) + 1) =
-      of_nat (2 ^ (2 * (Suc n))) * pochhammer z (Suc n) * pochhammer (z + 1/2) (Suc n)"
-    by (simp add: field_simps pochhammer_rec')
-  finally show ?case .
-qed
-
-lemma fact_double:
-  "fact (2 * n) = (2 ^ (2 * n) * pochhammer (1 / 2) n * fact n :: 'a::field_char_0)"
-  using pochhammer_double[of "1/2::'a" n] by (simp add: pochhammer_fact)
-
-lemma pochhammer_absorb_comp: "(r - of_nat k) * pochhammer (- r) k = r * pochhammer (-r + 1) k"
-  (is "?lhs = ?rhs")
-  for r :: "'a::comm_ring_1"
-proof -
-  have "?lhs = - pochhammer (- r) (Suc k)"
-    by (subst pochhammer_rec') (simp add: algebra_simps)
-  also have "\<dots> = ?rhs"
-    by (subst pochhammer_rec) simp
-  finally show ?thesis .
-qed
-
-
 subsection \<open>Generalized binomial coefficients\<close>
 
 definition gbinomial :: "'a::{semidom_divide,semiring_char_0} \<Rightarrow> nat \<Rightarrow> 'a"  (infixl "gchoose" 65)
@@ -1527,7 +1157,7 @@
   let ?B' = "{l. length l = m \<and> sum_list l = N \<and> hd l \<noteq> 0}"
   let ?f = "\<lambda>l. 0 # l"
   let ?g = "\<lambda>l. (hd l + 1) # tl l"
-  have 1: "xs \<noteq> [] \<Longrightarrow> x = hd xs \<Longrightarrow> x # tl xs = xs" for x xs
+  have 1: "xs \<noteq> [] \<Longrightarrow> x = hd xs \<Longrightarrow> x # tl xs = xs" for x :: nat and xs
     by simp
   have 2: "xs \<noteq> [] \<Longrightarrow> sum_list(tl xs) = sum_list xs - hd xs" for xs :: "nat list"
     by (auto simp add: neq_Nil_conv)
@@ -1660,26 +1290,6 @@
 
 subsection \<open>Misc\<close>
 
-lemma fact_code [code]:
-  "fact n = (of_nat (fold_atLeastAtMost_nat (op *) 2 n 1) :: 'a::semiring_char_0)"
-proof -
-  have "fact n = (of_nat (\<Prod>{1..n}) :: 'a)"
-    by (simp add: fact_prod)
-  also have "\<Prod>{1..n} = \<Prod>{2..n}"
-    by (intro prod.mono_neutral_right) auto
-  also have "\<dots> = fold_atLeastAtMost_nat (op *) 2 n 1"
-    by (simp add: prod_atLeastAtMost_code)
-  finally show ?thesis .
-qed
-
-lemma pochhammer_code [code]:
-  "pochhammer a n =
-    (if n = 0 then 1
-     else fold_atLeastAtMost_nat (\<lambda>n acc. (a + of_nat n) * acc) 0 (n - 1) 1)"
-  by (cases n)
-    (simp_all add: pochhammer_prod prod_atLeastAtMost_code [symmetric]
-      atLeastLessThanSuc_atLeastAtMost)
-
 lemma gbinomial_code [code]:
   "a gchoose n =
     (if n = 0 then 1
@@ -1688,7 +1298,7 @@
     (simp_all add: gbinomial_prod_rev prod_atLeastAtMost_code [symmetric]
       atLeastLessThanSuc_atLeastAtMost)
 
-lemmas [code del] = binomial_Suc_Suc binomial_n_0 binomial_0_Suc
+declare [[code drop: binomial]]
     
 lemma binomial_code [code]:
   "(n choose k) =