A study of v-number for some monomial ideals

Abstract

In this paper, we give formulas for v-number of edge ideals of some graphs like path, cycle, 1-clique sum of a path and a cycle, 1-clique sum of two cycles and join of two graphs. For an m-primary monomial ideal I⊂ S=K[x1,…,xt], we provide an explicit expression of v-number of I, denoted by v(I), and give an upper bound of v(I) in terms of the degree of its generators. We show that for a monomial ideal I, v(In+1) is bounded above by a linear polynomial for large n and for certain classes of monomial ideals, the upper bound is achieved for all n≥ 1. For m-primary monomial ideal I we prove that v(I)≤ reg(S/I) and their difference can be arbitrarily large.