Cohomology of finite modules over short Gorenstein rings
Abstract
Let R be a Gorenstein local ring with maximal ideal m satisfying m3=0m2. Set k=R/m and e=rankk(m/m2). If e>2 and M, N are finitely generated R-modules, we show that the formal power series Σi=0∞rankk(ExtiR(M,N)R k )ti and Σi=0∞rankk(ToriR(M,N)R k )ti are rational, with denominator 1-et+t2.
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