Lengths of modules over short Artin local rings

Abstract

Let (A,m) be a short Artin local ring (i.e., m3 = 0 and m2 ≠ 0). Assume A is not a hypersurface ring. We show there exists cA ≥ 2 such that if M is any finitely generated module with bounded betti-numbers then cA divides (M), the length of M. If A is not a complete intersection then there exists bA ≥ 2 such that if M is any module with curv(M) < \ curv(k) then bA divides (iA(M)) for all i ≥ 1 (here iA(M) denotes the ith-syzygy of M).