import standard using num section parameter {A : Type} parameter f : A → A → A parameter one : A parameter inv : A → A infixl `*`:75 := f postfix `^-1`:100 := inv definition is_assoc := ∀ a b c, (a*b)*c = a*b*c definition is_id := ∀ a, a*one = a definition is_inv := ∀ a, a*a^-1 = one end inductive group_struct (A : Type) : Type := | mk_group_struct : Π (mul : A → A → A) (one : A) (inv : A → A), is_assoc mul → is_id mul one → is_inv mul one inv → group_struct A class group_struct inductive group : Type := | mk_group : Π (A : Type), group_struct A → group definition carrier (g : group) : Type := group_rec (λ c s, c) g definition group_to_struct [instance] (g : group) : group_struct (carrier g) := group_rec (λ (A : Type) (s : group_struct A), s) g check group_struct definition mul [inline] {A : Type} {s : group_struct A} (a b : A) : A := group_struct_rec (λ mul one inv h1 h2 h3, mul) s a b infixl `*`:75 := mul section variable G1 : group variable G2 : group variables a b c : (carrier G2) variables d e : (carrier G1) check a * b * b check d * e end variable pos_real : Type.{1} variable rmul : pos_real → pos_real → pos_real variable rone : pos_real variable rinv : pos_real → pos_real axiom H1 : is_assoc rmul axiom H2 : is_id rmul rone axiom H3 : is_inv rmul rone rinv definition real_group_struct [inline] [instance] : group_struct pos_real := mk_group_struct rmul rone rinv H1 H2 H3 variables x y : pos_real check x * y theorem T (a b : pos_real): (rmul a b) = a*b := refl (rmul a b)