Socle degrees of Frobenius powers

Abstract

Let k be a field of positive characteristic p, R be a Gorenstein graded k-algebra, and S=R/J be an artinian quotient of R by a homogeneous ideal. We ask how the socle degrees of S are related to the socle degrees of FRe(S)=R/J[q]. If S has finite projective dimension as an R-module, then the socles of S and FRe(S) have the same dimension and the socle degrees are related by the formula: Di=qdi-(q-1)a(R), where d1 >... d D1 ... D are the socle degrees S and FRe(S), respectively, and a(R) is the a-invariant of the graded ring R, as introduced by Goto and Watanabe. We prove the converse when R is a complete intersection.

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