In this paper we show that evolution algebras over any given field
k are universally finite. In other words, given any finite group G, there exist
infinitely many regular evolution algebras X such that Aut(X) ∼= G. The proof
is built upon the construction of a covariant faithful functor from the category
of finite simple (non oriented) graphs to the category of (finite dimensional)
regular evolution algebras. Finally, we show that any constant finite algebraic
affine group scheme G over k is isomorphic to the algebraic affine group scheme
of automorphisms of a regular evolution algebra.
