The stability of independence polynomials of complete bipartite graphs

Abstract

The independence polynomial of a graph is termed stable if all its roots are located in the left half-plane \z ∈ C : Re(z) ≤ 0\, and the graph itself is also referred to as stable. Brown and Cameron (Electron. J. Combin. 25(1) (2018) \#P1.46) proved that the complete bipartite graph K1,n is stable and posed the question: Are all complete bipartite graphs stable? We answer this question by establishing the following results: itemize The complete bipartite graphs K2,n and K3,n are stable. For any integer k≥0, there exists an integer N(k)∈ N such that Km,m+k is stable for all m>N(k). For any rational > 1, there exists an integer N() ∈ N such that whenever m >N() and · m is an integer, Km, · m is not stable. itemize