On the real roots of σ-Polynomials

Abstract

The σ-polynomial is given by σ(G,x) = Σi=(G)n ai(G)\, xi, where ai(G) is the number of partitions of the vertices of G into i nonempty independent sets. These polynomials are closely related to chromatic polynomials, as the chromatic polynomial of G is given by Σi=(G)n ai(G)\, x(x-1) ·s (x-(i-1)). It is known that the closure of the real roots of chromatic polynomials is precisely \0,~1\ [32/27,∞), with (-∞,0), (0,1) and (1,32/27) being maximal zero-free intervals for roots of chromatic polynomials. We ask here whether such maximal zero-free intervals exist for σ-polynomials, and show that the only such interval is [0,∞) -- that is, the closure of the real roots of σ-polynomials is (-∞,0].