We define an equivalence as a (half)-adjoint equivalence, a pair of functors with a unit and counit which are natural isomorphisms and the triangle law Fη ≫ εF = 1, or in other words the composite F ⟶ FGF ⟶ F is the identity.

The triangle equation is written as a family of equalities between morphisms, it is more complicated if we write it as an equality of natural transformations, because then we would have to insert natural transformations like F ⟶ F1.

The other triangle equality. The proof follows the following proof in Globular: http://globular.science/1905.001

A functor that is part of a (half) adjoint equivalence