Theory Pf_Add
theory Pf_Add
imports Automatic_Refinement.Misc "HOL-Library.Monad_Syntax"
begin
lemma fun_ordI:
assumes "⋀x. ord (f x) (g x)"
shows "fun_ord ord f g"
using assms unfolding fun_ord_def by auto
lemma fun_ordD:
assumes "fun_ord ord f g"
shows "ord (f x) (g x)"
using assms unfolding fun_ord_def by auto
lemma mono_fun_fun_cnv:
assumes "⋀d. monotone (fun_ord ordA) ordB (λx. F x d)"
shows "monotone (fun_ord ordA) (fun_ord ordB) F"
apply rule
apply (rule fun_ordI)
using assms
by (blast dest: monotoneD)
lemma fun_lub_Sup[simp]: "fun_lub Sup = Sup"
unfolding fun_lub_def[abs_def]
by (clarsimp intro!: ext; metis image_def)
lemma fun_ord_le[simp]: "fun_ord (≤) = (≤)"
unfolding fun_ord_def[abs_def]
by (auto intro!: ext simp: le_fun_def)
end