-- Copyright (c) 2014 Microsoft Corporation. All rights reserved. -- Released under Apache 2.0 license as described in the file LICENSE. -- Author: Leonardo de Moura import data.prod.decl logic.wf open well_founded namespace prod section variables {A B : Type} variable (Ra : A → A → Prop) variable (Rb : B → B → Prop) inductive lex : A × B → A × B → Prop := left : ∀a₁ b₁ a₂ b₂, Ra a₁ a₂ → lex (a₁, b₁) (a₂, b₂), right : ∀a b₁ b₂, Rb b₁ b₂ → lex (a, b₁) (a, b₂) end context parameters {A B : Type} parameters {Ra : A → A → Prop} {Rb : B → B → Prop} infix `≺`:50 := lex Ra Rb definition accessible {a} (aca : acc Ra a) (acb : ∀b, acc Rb b): ∀b, acc (lex Ra Rb) (a, b) := acc.rec_on aca (λxa aca (iHa : ∀y, Ra y xa → ∀b, acc (lex Ra Rb) (y, b)), λb, acc.rec_on (acb b) (λxb acb (iHb : ∀y, Rb y xb → acc (lex Ra Rb) (xa, y)), acc.intro (xa, xb) (λp (lt : p ≺ (xa, xb)), have aux : xa = xa → xb = xb → acc (lex Ra Rb) p, from @lex.rec_on A B Ra Rb (λp₁ p₂, pr₁ p₂ = xa → pr₂ p₂ = xb → acc (lex Ra Rb) p₁) p (xa, xb) lt (λa₁ b₁ a₂ b₂ (H : Ra a₁ a₂) (eq₂ : a₂ = xa) (eq₃ : b₂ = xb), show acc (lex Ra Rb) (a₁, b₁), from have Ra₁ : Ra a₁ xa, from eq.rec_on eq₂ H, iHa a₁ Ra₁ b₁) (λa b₁ b₂ (H : Rb b₁ b₂) (eq₂ : a = xa) (eq₃ : b₂ = xb), show acc (lex Ra Rb) (a, b₁), from have Rb₁ : Rb b₁ xb, from eq.rec_on eq₃ H, have eq₂' : xa = a, from eq.rec_on eq₂ rfl, eq.rec_on eq₂' (iHb b₁ Rb₁)), aux rfl rfl))) -- The lexicographical order of well founded relations is well-founded definition wf (Ha : well_founded Ra) (Hb : well_founded Rb) : well_founded (lex Ra Rb) := well_founded.intro (λp, destruct p (λa b, accessible (Ha a) (well_founded.apply Hb) b)) end end prod