4a36f843f7
I changed the definition of pow so that a^(succ n) reduces to a * a^n rather than a^n * a. This has the nice effect that on nat and int, where multiplication is defined by recursion on the right, a^1 reduces to a, and a^2 reduces to a * a. The change was a pain in the neck, and in retrospect maybe not worth it, but oh, well.
236 lines
8.8 KiB
Text
236 lines
8.8 KiB
Text
/-
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Copyright (c) 2015 Jeremy Avigad. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Authors: Leonardo de Moura, Jeremy Avigad
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Finite products on a monoid, and finite sums on an additive monoid.
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We have to be careful with dependencies. This theory imports files from finset and list, which
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import basic files from nat. Then nat imports this file to instantiate finite products and sums.
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Bigops based on finsets go in the namespace algebra.finset. There are also versions based on sets,
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defined in group_set_bigops.lean.
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-/
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import .group .group_power data.list.basic data.list.perm data.finset.basic
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open algebra function binary quot subtype list finset
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namespace algebra
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variables {A B : Type}
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variable [deceqA : decidable_eq A]
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/- Prodl: product indexed by a list -/
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section monoid
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variable [mB : monoid B]
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include mB
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definition mulf (f : A → B) : B → A → B :=
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λ b a, b * f a
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definition Prodl (l : list A) (f : A → B) : B :=
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list.foldl (mulf f) 1 l
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-- ∏ x ← l, f x
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notation `∏` binders `←` l, r:(scoped f, Prodl l f) := r
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private theorem foldl_const (f : A → B) :
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∀ (l : list A) (b : B), foldl (mulf f) b l = b * foldl (mulf f) 1 l
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| [] b := by rewrite [*foldl_nil, mul_one]
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| (a::l) b := by rewrite [*foldl_cons, foldl_const, {foldl _ (mulf f 1 a) _}foldl_const, ↑mulf,
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one_mul, mul.assoc]
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theorem Prodl_nil (f : A → B) : Prodl [] f = 1 := rfl
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theorem Prodl_cons (f : A → B) (a : A) (l : list A) : Prodl (a::l) f = f a * Prodl l f :=
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by rewrite [↑Prodl, foldl_cons, foldl_const, ↑mulf, one_mul]
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theorem Prodl_append :
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∀ (l₁ l₂ : list A) (f : A → B), Prodl (l₁++l₂) f = Prodl l₁ f * Prodl l₂ f
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| [] l₂ f := by rewrite [append_nil_left, Prodl_nil, one_mul]
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| (a::l) l₂ f := by rewrite [append_cons, *Prodl_cons, Prodl_append, mul.assoc]
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section deceqA
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include deceqA
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theorem Prodl_insert_of_mem (f : A → B) {a : A} {l : list A} : a ∈ l →
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Prodl (insert a l) f = Prodl l f :=
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assume ainl, by rewrite [insert_eq_of_mem ainl]
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theorem Prodl_insert_of_not_mem (f : A → B) {a : A} {l : list A} :
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a ∉ l → Prodl (insert a l) f = f a * Prodl l f :=
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assume nainl, by rewrite [insert_eq_of_not_mem nainl, Prodl_cons]
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theorem Prodl_union {l₁ l₂ : list A} (f : A → B) (d : disjoint l₁ l₂) :
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Prodl (union l₁ l₂) f = Prodl l₁ f * Prodl l₂ f :=
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by rewrite [union_eq_append d, Prodl_append]
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end deceqA
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theorem Prodl_one : ∀(l : list A), Prodl l (λ x, 1) = (1:B)
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| [] := rfl
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| (a::l) := by rewrite [Prodl_cons, Prodl_one, mul_one]
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lemma Prodl_singleton {a : A} {f : A → B} : Prodl [a] f = f a :=
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!one_mul
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lemma Prodl_map {f : A → B} :
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∀ {l : list A}, Prodl l f = Prodl (map f l) id
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| nil := by rewrite [map_nil]
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| (a::l) := begin rewrite [map_cons, Prodl_cons f, Prodl_cons id (f a), Prodl_map] end
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open nat
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lemma Prodl_eq_pow_of_const {f : A → B} :
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∀ {l : list A} b, (∀ a, a ∈ l → f a = b) → Prodl l f = b ^ length l
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| nil := take b, assume Pconst, by rewrite [length_nil, {b^0}algebra.pow_zero]
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| (a::l) := take b, assume Pconst,
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assert Pconstl : ∀ a', a' ∈ l → f a' = b,
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from take a' Pa'in, Pconst a' (mem_cons_of_mem a Pa'in),
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by rewrite [Prodl_cons f, Pconst a !mem_cons, Prodl_eq_pow_of_const b Pconstl, length_cons, add_one, pow_succ b]
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end monoid
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section comm_monoid
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variable [cmB : comm_monoid B]
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include cmB
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theorem Prodl_mul (l : list A) (f g : A → B) : Prodl l (λx, f x * g x) = Prodl l f * Prodl l g :=
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list.induction_on l
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(by rewrite [*Prodl_nil, mul_one])
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(take a l,
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assume IH,
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by rewrite [*Prodl_cons, IH, *mul.assoc, mul.left_comm (Prodl l f)])
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end comm_monoid
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/- Prod: product indexed by a finset -/
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namespace finset
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variable [cmB : comm_monoid B]
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include cmB
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theorem mulf_rcomm (f : A → B) : right_commutative (mulf f) :=
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right_commutative_compose_right (@has_mul.mul B cmB) f (@mul.right_comm B cmB)
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theorem Prodl_eq_Prodl_of_perm (f : A → B) {l₁ l₂ : list A} :
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perm l₁ l₂ → Prodl l₁ f = Prodl l₂ f :=
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λ p, perm.foldl_eq_of_perm (mulf_rcomm f) p 1
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definition Prod (s : finset A) (f : A → B) : B :=
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quot.lift_on s
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(λ l, Prodl (elt_of l) f)
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(λ l₁ l₂ p, Prodl_eq_Prodl_of_perm f p)
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-- ∏ x ∈ s, f x
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notation `∏` binders `∈` s, r:(scoped f, prod s f) := r
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theorem Prod_empty (f : A → B) : Prod ∅ f = 1 :=
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Prodl_nil f
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theorem Prod_mul (s : finset A) (f g : A → B) : Prod s (λx, f x * g x) = Prod s f * Prod s g :=
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quot.induction_on s (take u, !Prodl_mul)
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section deceqA
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include deceqA
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theorem Prod_insert_of_mem (f : A → B) {a : A} {s : finset A} :
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a ∈ s → Prod (insert a s) f = Prod s f :=
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quot.induction_on s
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(λ l ainl, Prodl_insert_of_mem f ainl)
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theorem Prod_insert_of_not_mem (f : A → B) {a : A} {s : finset A} :
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a ∉ s → Prod (insert a s) f = f a * Prod s f :=
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quot.induction_on s
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(λ l nainl, Prodl_insert_of_not_mem f nainl)
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theorem Prod_union (f : A → B) {s₁ s₂ : finset A} (disj : s₁ ∩ s₂ = ∅) :
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Prod (s₁ ∪ s₂) f = Prod s₁ f * Prod s₂ f :=
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have H1 : disjoint s₁ s₂ → Prod (s₁ ∪ s₂) f = Prod s₁ f * Prod s₂ f, from
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quot.induction_on₂ s₁ s₂
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(λ l₁ l₂ d, Prodl_union f d),
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H1 (disjoint_of_inter_eq_empty disj)
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theorem Prod_ext {s : finset A} {f g : A → B} :
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(∀{x}, x ∈ s → f x = g x) → Prod s f = Prod s g :=
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finset.induction_on s
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(assume H, rfl)
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(take x s', assume H1 : x ∉ s',
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assume IH : (∀ {x : A}, x ∈ s' → f x = g x) → Prod s' f = Prod s' g,
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assume H2 : ∀{y}, y ∈ insert x s' → f y = g y,
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assert H3 : ∀y, y ∈ s' → f y = g y, from
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take y, assume H', H2 (mem_insert_of_mem _ H'),
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assert H4 : f x = g x, from H2 !mem_insert,
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by rewrite [Prod_insert_of_not_mem f H1, Prod_insert_of_not_mem g H1, IH H3, H4])
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end deceqA
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theorem Prod_one (s : finset A) : Prod s (λ x, 1) = (1:B) :=
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quot.induction_on s (take u, !Prodl_one)
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end finset
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section add_monoid
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variable [amB : add_monoid B]
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include amB
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local attribute add_monoid.to_monoid [trans-instance]
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definition Suml (l : list A) (f : A → B) : B := Prodl l f
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-- ∑ x ← l, f x
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notation `∑` binders `←` l, r:(scoped f, Suml l f) := r
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theorem Suml_nil (f : A → B) : Suml [] f = 0 := Prodl_nil f
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theorem Suml_cons (f : A → B) (a : A) (l : list A) : Suml (a::l) f = f a + Suml l f :=
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Prodl_cons f a l
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theorem Suml_append (l₁ l₂ : list A) (f : A → B) : Suml (l₁++l₂) f = Suml l₁ f + Suml l₂ f :=
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Prodl_append l₁ l₂ f
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section deceqA
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include deceqA
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theorem Suml_insert_of_mem (f : A → B) {a : A} {l : list A} (H : a ∈ l) :
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Suml (insert a l) f = Suml l f := Prodl_insert_of_mem f H
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theorem Suml_insert_of_not_mem (f : A → B) {a : A} {l : list A} (H : a ∉ l) :
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Suml (insert a l) f = f a + Suml l f := Prodl_insert_of_not_mem f H
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theorem Suml_union {l₁ l₂ : list A} (f : A → B) (d : disjoint l₁ l₂) :
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Suml (union l₁ l₂) f = Suml l₁ f + Suml l₂ f := Prodl_union f d
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end deceqA
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theorem Suml_zero (l : list A) : Suml l (λ x, 0) = (0:B) := Prodl_one l
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end add_monoid
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section add_comm_monoid
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variable [acmB : add_comm_monoid B]
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include acmB
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local attribute add_comm_monoid.to_comm_monoid [trans-instance]
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theorem Suml_add (l : list A) (f g : A → B) : Suml l (λx, f x + g x) = Suml l f + Suml l g :=
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Prodl_mul l f g
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end add_comm_monoid
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/- Sum -/
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namespace finset
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variable [acmB : add_comm_monoid B]
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include acmB
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local attribute add_comm_monoid.to_comm_monoid [trans-instance]
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definition Sum (s : finset A) (f : A → B) : B := Prod s f
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-- ∑ x ∈ s, f x
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notation `∑` binders `∈` s, r:(scoped f, Sum s f) := r
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theorem Sum_empty (f : A → B) : Sum ∅ f = 0 := Prod_empty f
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theorem Sum_add (s : finset A) (f g : A → B) :
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Sum s (λx, f x + g x) = Sum s f + Sum s g := Prod_mul s f g
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section deceqA
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include deceqA
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theorem Sum_insert_of_mem (f : A → B) {a : A} {s : finset A} (H : a ∈ s) :
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Sum (insert a s) f = Sum s f := Prod_insert_of_mem f H
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theorem Sum_insert_of_not_mem (f : A → B) {a : A} {s : finset A} (H : a ∉ s) :
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Sum (insert a s) f = f a + Sum s f := Prod_insert_of_not_mem f H
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theorem Sum_union (f : A → B) {s₁ s₂ : finset A} (disj : s₁ ∩ s₂ = ∅) :
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Sum (s₁ ∪ s₂) f = Sum s₁ f + Sum s₂ f := Prod_union f disj
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theorem Sum_ext {s : finset A} {f g : A → B} (H : ∀x, x ∈ s → f x = g x) :
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Sum s f = Sum s g := Prod_ext H
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end deceqA
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theorem Sum_zero (s : finset A) : Sum s (λ x, 0) = (0:B) := Prod_one s
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end finset
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end algebra
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