Nonlinear and spin-glass susceptibilities of three site-diluted systems

Abstract

The nonlinear magnetic 3 and spin-glass sg susceptibilities in zero applied field are obtained, from tempered Monte Carlo simulations, for three different spin glasses (SGs) of Ising spins with quenched site disorder. We find that the relation -T33=sg-2/3 (T is the temperature), which holds for Edwards-Anderson SGs, is approximately fulfilled in canonical-like SGs. For nearest neighbor antiferromagnetic interactions, on a 0.4 fraction of all sites in fcc lattices, as well as for spatially disordered Ising dipolar (DID) systems, -T33 and sg appear to diverge in the same manner at the critical temperature Tsg. However, -T33 is smaller than sg by over two orders of magnitude in the diluted fcc system. In DID systems, -T33/sg is very sensitive to the systems aspect ratio. Whereas near Tsg, sg varies by approximately a factor of 2 as system shape varies from cubic to long-thin-needle shapes, 3 sweeps over some four decades.