Chromatic Zeros on the Limit G(p,)∞ of the Family G(p,)m of Hierarchical Graphs

Abstract

We calculate the continuous accumulation set Bq(p,) of zeros of the chromatic polynomial P(G(p,)m,q) in the limit m ∞, on a family of graphs G(p,)m defined such that G(p,)m is obtained from G(p,)m-1 by replacing each edge (i.e., bond) on G(p,)m by p paths each of length edges, starting with the tree graph T2. Our method uses the property that the chromatic polynomial P(G,q) of a graph G is equal to the v=-1 evaluation of the partition function of the q-state Potts model, together with (i) the property that Z(G(p,)m,q,v) can be expressed via an exact closed-form real-space renormalization (RG) group transformation in terms of Z(G(p,)m-1,q,v'), where v'=F(p,),q(v) is a rational function of v and q and (ii) Bq(p,)(v) is the locus in the complex q-plane that separates regions of different asymptotic behavior of the m-fold iterated RG transformation F(p,),q(v) in the m ∞ limit. Thus, our results involve calculations of region diagrams in the complex q-plane showing the type of behavior that occurs in the m ∞ limit of the m-fold iterated RG transformation mapping F(p,),q(v) starting with the initial value v=v0=-1. Calculations are presented of the maximal point qc(G(p,)∞) at which the locus Bq crosses the real-q axis, as well as several other points at which, depending on p and , the locus Bq crosses this axis. We give explicit results for a variety of (p,) cases and observe a number of interesting features. Calculations of the ground-state degeneracy of the Potts antiferromagnet at qc(G(p,)∞) are presented. This work extends a previous study with R. Roeder of the (p,)=(2,2) case to higher p and values.

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