Initially Regular Sequences on Cycles and Depth of Unicyclic Graphs

Abstract

In this article, we establish initially regular sequences on cycles of the form C3n+2 for n 1, in the sense of FHM-ini. These sequences accurately compute the depth of these cycles, completing the case of finding effective initially regular sequences on cycles. Our approach involves a careful analysis of associated primes of initial ideals of the form ini>(I,f) for arbitrary monomial ideals I and f linear sums. We describe the minimal associated primes of these ideals in terms of the minimal primes of I. Moreover, we obtain a description of the embedded associated primes of arbitrary monomial ideals. Finally, we accurately compute the depth of certain types of unicyclic graphs.