Stanley depth of monomial ideals with small number of generators

Abstract

For a monomial ideal I⊂ S=K[x1,...,xn], we show that (S/I)≥ n-g(I), where g(I) is the number of the minimal monomial generators of I. If I=vI', where v∈ S is a monomial, then we see that (S/I)=(S/I'). We prove that if I is a monomial ideal I⊂ S minimally generated by three monomials, then I and S/I satisfy the Stanley conjecture. Given a saturated monomial ideal I⊂ K[x1,x2,x3] we show that (I)=2. As a consequence, (I)≥ (K[x1,x2,x3]/I)+1 for any monomial ideal in I⊂ K[x1,x2,x3].