Exponential control of overlap in the replica method for p-spin Sherrington-Kirkpatrick model

Abstract

Recently, Michel Talagrand computed the large deviations limit N∞(Na)-1 ZNa for the moments of the partition function ZN in the Sherrington-Kirkpatrick model for all real a≥ 0. For a≥ 1 the limit is given by Guerra's inverse bound and this result extends the classical physicist's replica method that corresponds to integer a. We give a new proof for a≥ 1 in the case of the pure p-spin SK model that provides a strong exponential control of the overlap.

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