feat(library/data/less_than.lean): add finite ordinals from Haitao Zhang

2015-06-05 20:34:49 +10:00 · 2015-06-05 20:34:49 +10:00 · 453da48dd5
commit 453da48dd5
parent 370860e1b0
2 changed files with 74 additions and 1 deletions
--- a/library/data/data.md
+++ b/library/data/data.md
@ -12,8 +12,9 @@ Basic types:
 * [string](string.lean) : ascii strings
 * [nat](nat/nat.md) : the natural numbers
 * [fin](fin.lean) : finite ordinals
+* [less_than](less_than.lean) : finite ordinals
 * [int](int/int.md) : the integers
-* [rat](rat/rat.md) : the integers
+* [rat](rat/rat.md) : the rationals

 Constructors:

--- a/library/data/less_than.lean
+++ b/library/data/less_than.lean
@ -0,0 +1,72 @@
+/-
+Copyright (c) 2015 Haitao Zhang. All rights reserved.
+Released under Apache 2.0 license as described in the file LICENSE.
+Author: Haitao Zhang
+
+Finite ordinal types.
+-/
+import data.list.basic data.finset.basic data.fintype.card
+open eq.ops nat function list finset fintype
+
+structure less_than (n : nat) := (val : nat) (is_lt : val < n)
+attribute less_than.val [coercion]
+
+namespace less_than
+
+section
+open decidable
+protected definition has_decidable_eq [instance] (n : nat) : ∀ (i j : less_than n), decidable (i = j)
+| (mk ival ilt) (mk jval jlt) :=
+      match nat.has_decidable_eq ival jval with
+      | inl veq := inl (by substvars)
+      | inr vne := inr (by intro h; injection h; contradiction)
+      end
+end
+
+lemma dinj_lt (n : nat) : dinj (λ i, i < n) less_than.mk :=
+take a1 a2 Pa1 Pa2 Pmkeq, less_than.no_confusion Pmkeq (λ Pe Pqe, Pe)
+
+lemma val_mk (n i : nat) (Plt : i < n) : less_than.val (less_than.mk i Plt) = i := rfl
+
+definition upto [reducible] (n : nat) : list (less_than n) :=
+dmap (λ i, i < n) less_than.mk (list.upto n)
+
+lemma nodup_upto (n : nat) : nodup (upto n) :=
+dmap_nodup_of_dinj (dinj_lt n) (list.nodup_upto n)
+
+lemma mem_upto (n : nat) : ∀ (i : less_than n), i ∈ upto n :=
+take i, less_than.destruct i
+  (take ival Piltn,
+    assert Pin : ival ∈ list.upto n, from mem_upto_of_lt Piltn,
+    mem_of_dmap Piltn Pin)
+
+lemma upto_zero : upto 0 = [] :=
+by rewrite [↑upto, list.upto_nil, dmap_nil]
+
+lemma map_val_upto (n : nat) : map less_than.val (upto n) = list.upto n :=
+map_of_dmap_inv_pos (val_mk n) (@lt_of_mem_upto n)
+
+lemma length_upto (n : nat) : length (upto n) = n :=
+calc
+  length (upto n) = length (list.upto n) : (map_val_upto n ▸ length_map less_than.val (upto n))⁻¹
+              ... = n                    : list.length_upto n
+
+definition fintype_less_than [instance] (n : nat) : fintype (less_than n) :=
+fintype.mk (upto n) (nodup_upto n) (mem_upto n)
+
+section pigeonhole
+open fintype
+
+lemma card_less_than (n : nat) : card (less_than n) = n := length_upto n
+
+theorem pigeonhole {n m : nat} (Pmltn : m < n) : ¬ (∃ f : less_than n → less_than m, injective f) :=
+not.intro
+  (assume Pex, absurd Pmltn (not_lt_of_ge
+    (calc
+        n = card (less_than n) : card_less_than
+      ... ≤ card (less_than m) : card_le_of_inj (less_than n) (less_than m) Pex
+      ... = m : card_less_than)))
+
+end pigeonhole
+
+end less_than