lean2/library/data/set/card.lean

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/-
Copyright (c) 2015 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Author: Jeremy Avigad
Cardinality of finite sets.
-/
import .finite data.finset.card
open nat classical
namespace set
variable {A : Type}
noncomputable definition card (s : set A) := finset.card (set.to_finset s)
theorem card_to_set (s : finset A) : card (finset.to_set s) = finset.card s :=
by rewrite [↑card, to_finset_to_set]
theorem card_of_not_finite {s : set A} (nfins : ¬ finite s) : card s = 0 :=
by rewrite [↑card, to_finset_of_not_finite nfins]
theorem card_empty : card (∅ : set A) = 0 :=
by rewrite [-finset.to_set_empty, card_to_set]
theorem card_insert_of_mem {a : A} {s : set A} (H : a ∈ s) : card (insert a s) = card s :=
if fins : finite s then
(by rewrite [↑card, to_finset_insert, -mem_to_finset_eq at H, finset.card_insert_of_mem H])
else
(have ¬ finite (insert a s), from suppose _, absurd (!finite_of_finite_insert this) fins,
by rewrite [card_of_not_finite fins, card_of_not_finite this])
theorem card_insert_of_not_mem {a : A} {s : set A} [finite s] (H : a ∉ s) :
card (insert a s) = card s + 1 :=
by rewrite [↑card, to_finset_insert, -mem_to_finset_eq at H, finset.card_insert_of_not_mem H]
theorem card_insert_le (a : A) (s : set A) [finite s] :
card (insert a s) ≤ card s + 1 :=
if H : a ∈ s then by rewrite [card_insert_of_mem H]; apply le_succ
else by rewrite [card_insert_of_not_mem H]
theorem card_singleton (a : A) : card '{a} = 1 :=
by rewrite [card_insert_of_not_mem !not_mem_empty, card_empty]
/- Note: the induction tactic does not work well with the set induction principle with the
extra predicate "finite". -/
theorem eq_empty_of_card_eq_zero {s : set A} [finite s] : card s = 0 → s = ∅ :=
induction_on_finite s
(by intro H; exact rfl)
(begin
intro a s' fins' anins IH H,
rewrite (card_insert_of_not_mem anins) at H,
apply nat.no_confusion H
end)
theorem card_upto (n : ) : card {i | i < n} = n :=
by rewrite [↑card, to_finset_upto, finset.card_upto]
theorem card_add_card (s₁ s₂ : set A) [finite s₁] [finite s₂] :
card s₁ + card s₂ = card (s₁ s₂) + card (s₁ ∩ s₂) :=
begin
rewrite [-to_set_to_finset s₁, -to_set_to_finset s₂],
rewrite [-finset.to_set_union, -finset.to_set_inter, *card_to_set],
apply finset.card_add_card
end
theorem card_union (s₁ s₂ : set A) [finite s₁] [finite s₂] :
card (s₁ s₂) = card s₁ + card s₂ - card (s₁ ∩ s₂) :=
calc
card (s₁ s₂) = card (s₁ s₂) + card (s₁ ∩ s₂) - card (s₁ ∩ s₂) : nat.add_sub_cancel
... = card s₁ + card s₂ - card (s₁ ∩ s₂) : card_add_card s₁ s₂
theorem card_union_of_disjoint {s₁ s₂ : set A} [finite s₁] [finite s₂] (H : s₁ ∩ s₂ = ∅) :
card (s₁ s₂) = card s₁ + card s₂ :=
by rewrite [card_union, H, card_empty]
theorem card_eq_card_add_card_diff {s₁ s₂ : set A} [finite s₁] [finite s₂] (H : s₁ ⊆ s₂) :
card s₂ = card s₁ + card (s₂ \ s₁) :=
have H1 : s₁ ∩ (s₂ \ s₁) = ∅,
from eq_empty_of_forall_not_mem (take x, assume H, (and.right (and.right H)) (and.left H)),
have s₂ = s₁ (s₂ \ s₁), from eq.symm (union_diff_cancel H),
calc
card s₂ = card (s₁ (s₂ \ s₁)) : {this}
... = card s₁ + card (s₂ \ s₁) : card_union_of_disjoint H1
theorem card_le_card_of_subset {s₁ s₂ : set A} [finite s₁] [finite s₂] (H : s₁ ⊆ s₂) :
card s₁ ≤ card s₂ :=
calc
card s₂ = card s₁ + card (s₂ \ s₁) : card_eq_card_add_card_diff H
... ≥ card s₁ : le_add_right
variable {B : Type}
theorem card_image_eq_of_inj_on {f : A → B} {s : set A} [finite s] (injfs : inj_on f s) :
card (image f s) = card s :=
begin
rewrite [↑card, to_finset_image];
apply finset.card_image_eq_of_inj_on,
rewrite to_set_to_finset,
apply injfs
end
theorem card_le_of_inj_on (a : set A) (b : set B) [finite b]
(Pex : ∃ f : A → B, inj_on f a ∧ (image f a ⊆ b)) :
card a ≤ card b :=
by_cases
(assume fina : finite a,
obtain f H, from Pex,
finset.card_le_of_inj_on (to_finset a) (to_finset b)
(exists.intro f
begin
rewrite [finset.subset_eq_to_set_subset, finset.to_set_image, *to_set_to_finset],
exact H
end))
(assume nfina : ¬ finite a,
by rewrite [card_of_not_finite nfina]; exact !zero_le)
theorem card_image_le (f : A → B) (s : set A) [finite s] : card (image f s) ≤ card s :=
by rewrite [↑card, to_finset_image]; apply finset.card_image_le
theorem inj_on_of_card_image_eq {f : A → B} {s : set A} [finite s]
(H : card (image f s) = card s) : inj_on f s :=
begin
rewrite -(to_set_to_finset s),
apply finset.inj_on_of_card_image_eq,
rewrite [-to_finset_to_set (finset.image _ _), finset.to_set_image, to_set_to_finset],
exact H
end
theorem card_pos_of_mem {a : A} {s : set A} [finite s] (H : a ∈ s) : card s > 0 :=
have (#finset a ∈ to_finset s), by rewrite [finset.mem_eq_mem_to_set, to_set_to_finset]; apply H,
finset.card_pos_of_mem this
theorem eq_of_card_eq_of_subset {s₁ s₂ : set A} [finite s₁] [finite s₂]
(Hcard : card s₁ = card s₂) (Hsub : s₁ ⊆ s₂) :
s₁ = s₂ :=
begin
rewrite [-to_set_to_finset s₁, -to_set_to_finset s₂, -finset.eq_eq_to_set_eq],
apply finset.eq_of_card_eq_of_subset Hcard,
rewrite [to_finset_subset_to_finset_eq],
exact Hsub
end
theorem exists_two_of_card_gt_one {s : set A} (H : 1 < card s) : ∃ a b, a ∈ s ∧ b ∈ s ∧ a ≠ b :=
have fins : finite s, from
by_contradiction
(assume nfins, by rewrite [card_of_not_finite nfins at H]; apply !not_succ_le_zero H),
by rewrite [-to_set_to_finset s]; apply finset.exists_two_of_card_gt_one H
end set