Reduction of Spin Glasses applied to the Migdal-Kadanoff Hierarchical Lattice

Abstract

A reduction procedure to obtain ground states of spin glasses on sparse graphs is developed and tested on the hierarchical lattice associated with the Migdal-Kadanoff approximation for low-dimensional lattices. While more generally applicable, these rules here lead to a complete reduction of the lattice. The stiffness exponent governing the scaling of the defect energy E with system size L, σ( E) Ly, is obtained as y3=0.25546(3) by reducing the equivalent of lattices up to L=2100 in d=3, and as y4=0.76382(4) for up to L=235 in d=4. The reduction rules allow the exact determination of the ground state energy, entropy, and also provide an approximation to the overlap distribution. With these methods, some well-know and some new features of diluted hierarchical lattices are calculated.

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