Gorensteinness of short local rings in terms of the vanishing of Ext and Tor

Abstract

Let (R,m) be a commutative Noetherian local ring which contains a regular sequence x = x1,…,xd ∈ m m2 such that m3 ⊂eq (x) . Let M be a finite R -module with maximal complexity or curvature, e.g., M can be a nonzero direct summand of some syzygy module of the residue field R/m . It is shown that the following are equivalent: (1) R is Gorenstein, (2) ExtR 0(M,R)=0, and (3) Tor 0R(M,ω) = 0, where ω denotes a canonical module of R. It gives a partial answer to a question raised by Takahashi. Moreover, the vanishing of ExtR 0(ω,N) for certain R -module N is also analyzed. Finally, it is studied why Gorensteinness of such local rings is important.