Filter-regular sequences, almost complete intersections and Stanley's conjecture

Abstract

Let K be a field and I a monomial ideal of the polynomial ring S=K[x1,..., xn] generated by monomials u1,u2,..., ut. We show that S/I is pretty clean if either: 1) u1,u2,..., ut is a filter-regular sequence, 2) u1,u2,..., ut is a d-sequence; or 3) I is almost complete intersection. In particular, in each of these cases, S/I is sequentially Cohen-Macaulay and both Stanley's and h-regularity conjectures, on Stanley decompositions, hold for S/I. Also, we prove that if I is the Stanley-Reisner ideal of a locally complete intersection simplicial complex on [n], then Stanley's conjecture holds for S/I.