Asymmetric complete resolutions and vanishing of Ext over Gorenstein rings

Abstract

We construct a class of Gorenstein local rings R which admit minimal complete R-free resolutions C such that the sequence \R Ci\ is constant for i< 0, and grows exponentially for all i>0. Over these rings we show that there exist finitely generated R-modules M and N such that iR(M,N)=0 for all i> 0, but iR(N,M) 0 for all i>0.

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