On the Replica Symmetry of a Variant of the Sherrington-Kirkpatrick Spin Glass
Abstract
We consider N i.i.d. Ising spins with mean m∈ (-1,1) whose interactions are described by a Sherrington-Kirkpatrick Hamiltonian with a quartic correction. This model was recently introduced by Bolthausen in Bolt2 as a toy model to understand whether a second moment argument can be used to derive the replica symmetric formula in the full high temperature regime if m≠ 0. In Bolt2, Bolthausen suggested that a natural analogue of the de Almeida-Thouless condition for the toy model is equationeq:conj β2(1-m2)2≤ 1. \, \, \, \, \, \, \, \, \, \, \, \, \, \, \, \, \, \, (1)equation Here, β ≥ 0 corresponds to the inverse temperature. While the second moment method implies replica symmetry for β sufficiently small, Bolthausen showed that the method fails to prove replica symmetry in the full region described by (1). A natural question that was left open in Bolt2 is whether (1) correctly characterizes the high temperature phase of the toy model. In this note, we show that this is indeed not the case. We prove that if |m| ≥ m*, for some m* ∈ (0,1), the limiting free energy of the toy model is negative for suitable β that satisfy (1).
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