On the rate of generic Gorenstein K-algebras

Abstract

The rate of a standard graded K-algebra A is a measure of the growth of the shifts in a minimal free resolution of K as an A-module. In particular A has rate one if and only if it is Koszul. It is known that a generic Artinian Gorenstein algebra of embedding dimension n ≥ 3 and socle degree s=3 is Koszul. We prove that a generic Artinian Gorenstein algebra with n≥ 4 and s 3 has rate s2 . In the process we show that such an algebra is generated in degree s2 +1. This gives a partial positive answer to a longstanding conjecture stated by the first author on the minimal free resolution of a generic Artinian Gorenstein ring of odd socle degree.