(* Title: HOL/ex/MonoidGroup.thy
Author: Markus Wenzel
*)
section \<open>Monoids and Groups as predicates over record schemes\<close>
theory MonoidGroup imports Main begin
record 'a monoid_sig =
times :: "'a => 'a => 'a"
one :: 'a
record 'a group_sig = "'a monoid_sig" +
inv :: "'a => 'a"
definition
monoid :: "(| times :: 'a => 'a => 'a, one :: 'a, ... :: 'b |) => bool" where
"monoid M = (\<forall>x y z.
times M (times M x y) z = times M x (times M y z) \<and>
times M (one M) x = x \<and> times M x (one M) = x)"
definition
group :: "(| times :: 'a => 'a => 'a, one :: 'a, inv :: 'a => 'a, ... :: 'b |) => bool" where
"group G = (monoid G \<and> (\<forall>x. times G (inv G x) x = one G))"
definition
reverse :: "(| times :: 'a => 'a => 'a, one :: 'a, ... :: 'b |) =>
(| times :: 'a => 'a => 'a, one :: 'a, ... :: 'b |)" where
"reverse M = M (| times := \<lambda>x y. times M y x |)"
end