Uniqueness and Non-Uniqueness for Spin-Glass Ground States on Trees

Abstract

We consider a Spin Glass at temperature T = 0 where the underlying graph is a locally finite tree. We prove for a wide range of coupling distributions that uniqueness of ground states is equivalent to the maximal flow from any vertex to ∞ (where each edge e has capacity |Je|) being equal to zero which is equivalent to recurrence of the simple random walk on the tree.