Betti numbers for cochordal zero-divisor graphs of commutative rings

Abstract

This paper studies the zero-divisor graphs attached to several finite chain-ring families and computes the homological invariants of their edge ideals by using cochordal constructible systems. We begin with a general layered graph C(q,L), whose vertices are arranged according to valuation layers and whose adjacency is governed by the single rule k+ L, form some integers k and . This graph models the zero-divisor structure of a finite chain ring with residue field of order q and nilpotency index L. We prove that C(q,L) is cochordal, determine its type sequence, then correct and refine the Betti formula of its edge ideal [Dung and Vu, Cochordal zero divisor graphs and Betti numbers of their edge ideals, Comm. Algebra 54(2) (2026) 736--744]. The results are then specialized to the Gaussian quotient rings Z2m[i] and to the truncated polynomial rings Zp[x]/(xc). We compute projective dimension, regularity, independence number, height, Hilbert series, and Cohen--Macaulay behavior. The computations show that these quotient rings have 2-linear resolutions, while Cohen--Macaulayness occurs only in the expected degenerate or complete-graph cases.