Characterization of Lee-Yang polynomials

Abstract

The Lee-Yang circle theorem describes complex polynomials of degree n in z with all their zeros on the unit circle |z|=1. These polynomials are obtained by taking z1=...=zn=z in certain multiaffine polynomials (z1,...,zn) which we call Lee-Yang polynomials (they do not vanish when |z1|,...,|zn|<1 or |z1|,...,|zn|>1). We characterize the Lee-Yang polynomials in n+1 variables in terms of polynomials in n variables (those such that (z1,...,zn)0 when |z1|,...,|zn|<1). This characterization gives us a good understanding of Lee-Yang polynomials and allows us to exhibit some new examples. In the physical situation where the are temperature dependent partition functions, we find that those which are Lee-Yang polynomials for all temperatures are precisely the polynomials with pair interactions originally considered by Lee and Yang.