Ground State Properties of the Diluted Sherrington-Kirkpatrick Spin Glass

Abstract

We present a numerical study of ground states of the dilute versions of the Sherrington-Kirkpatrick (SK) mean-field spin glass. In contrast to so-called "sparse" mean-field spin glasses that have been studied widely on random networks of finite (average or regular) degree, the networks studied here are randomly bond-diluted to an overall density p, such that the average degree diverges as pN with the system size N. Ground-state energies are obtained with high accuracy for random instances over a wide range of fixed p. Since this is a NP-hard combinatorial problem, we employ the Extremal Optimization heuristic to that end. We find that the exponent describing the finite-size corrections, ω, varies continuously with p, a somewhat surprising result, as one would not expect that gradual bond-dilution would change the T=0 universality class of a statistical model. For p1, the familiar result of ω(p=1)≈23 for SK is obtained.