The 2-Quasi-Regularizability Conjecture and Independence Polynomials of Wp Graphs

Abstract

Hoang, Levit, Mandrescu and Pham asked for structural conditions ensuring that the independence polynomial of a p graph is log-concave, or at least unimodal, and conjectured that a connected 2 graph is 2-quasi-regularizable if and only if n(G) 3α(G) (2026). We prove the conjecture. The key point is a local expansion theorem: if G is connected and belongs to 2, then every non-maximum independent set A satisfies \[ |NG(A)| 2|A|. \] Thus the only possible obstruction to 2-quasi-regularizability in a connected 2 graph comes from maximum independent sets, where the condition is exactly n(G)-α(G) 2α(G). We also give coefficient criteria for log-concavity and unimodality of independence polynomials of p graphs. These criteria combine the standard two-sided coefficient inequalities, as collected by Hoang--Levit--Mandrescu--Pham, with λ-quasi-regularizability. The new p=2 threshold proved here inserts the missing case into the same framework and yields explicit log-concavity and unimodality regions for connected 2 graphs.