A Criterion for Isomorphism of Artinian Gorenstein Algebras

Abstract

Let A be an Artinian Gorenstein algebra over an infinite field k with either char(k)=0 or char(k)>, where is the socle degree of A. To every such algebra and a linear projection π on its maximal ideal m with range equal to the socle Soc(A) of A, one can associate a certain algebraic hypersurface Sπ⊂ m, which is the graph of a polynomial map Pπ:ker\,π Soc(A) k. Recently, the author and his collaborators have obtained the following surprising criterion: two Artinian Gorenstein algebras A, A are isomorphic if and only if any two hypersurfaces Sπ and Sπ arising from A and A, respectively, are affinely equivalent. The proof is indirect and relies on a geometric argument. In the present paper we give a short algebraic proof of this statement. We also discuss a connection, established elsewhere, between the polynomials Pπ and Macaulay inverse systems.