Large lower bounds for the betti numbers of graded modules with low regularity

Abstract

Suppose that M is a finitely-generated graded module of codimension c≥ 3 over a polynomial ring and that the regularity of M is at most 2a-2 where a≥ 2 is the minimal degree of a first syzygy of M. Then we show that the sum of the betti numbers of M is at least β0(M)(2c + 2c-1). In addition, if c ≥ 9 then for each 1≤ i≤ c/2, we show βi(M)≥ 2β0(M)c i.