Ground State Entropy of Potts Antiferromagnets: Cases with Noncompact W Boundaries Having Multiple Points at 1/q = 0
Abstract
We present exact calculations of the zero-temperature partition function, Z(G,q,T=0), and ground-state degeneracy (per site), W(G,q), for the q-state Potts antiferromagnet on a number of families of graphs G for which the boundary B of regions of analyticity of W in the complex q plane is noncompact and has the properties that (i) in the z=1/q plane, the point z=0 is a multiple point on B and (ii) B includes support for Re(q) < 0. These families are generated by the method of homeomorphic expansion. Our results give further insight into the conditions for the validity of large--q series expansions for the reduced function Wred.=q-1W.
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