High-temperature expansion methods for Ising systems with quenched impurities
- 1 May 1979
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review B
- Vol. 19 (9) , 4631-4645
- https://doi.org/10.1103/physrevb.19.4631
Abstract
Two methods are used to obtain high-temperature series for Ising systems with quenched randomness. One is a direct averaging of a linked-cluster expansion, the other combines the primitive high-temperature expansion and the Edward replica trick. After a bond renormalization, the second expansion is seen to be identical to the first term by term. The series are developed for the case of a spin-glass model in which the bonds have a probability which is symmetrically distributed about zero. Specifically, series for the free energy and appropriately chosen susceptibility are given to 11th and 10th orders, respectively, for a hypercubic lattice in any dimension and for any symmetrical bond distribution.Keywords
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