Operator Norm Bounds on the Correlation Matrix of the SK Model at High Temperature

Abstract

We prove that the two point correlation matrix M= ( σi ; σj)1≤ i,j≤ N ∈ RN× N of the Sherrington-Kirkpatrick model has the property that for every ε>0 there exists Kε>0, that is independent of N, such that \[ P( \| M \|op ≤ Kε) ≥ 1- ε \] for N large enough, for suitable interaction and external field parameters (β,h) in the replica symmetric region. In other words, the operator norm of M is of order one with high probability. Our results are in particular valid for all (β,h)∈ (0,1)× (0,∞) and thus complement recently obtained results in EAG,BSXY that imply the operator norm boundedness of M for all β<1 in the special case of vanishing external field.