Domain Growth in Long-range Ising Models with Disorder

Abstract

Recent advances have highlighted the rich low-temperature kinetics of the long-range Ising model (LRIM). This study investigates domain growth in an LRIM with quenched disorder, following a deep low-temperature quench. Specifically, we consider an Ising model with interactions that decay as J(r) r-(D+σ), where D is the spatial dimension and σ > 0 is the power-law exponent. The quenched disorder is introduced via random pinning fields at each lattice site. For nearest-neighbor models, we expect that domain growth during activated dynamics is logarithmic in nature: R(t) ( t)α, with growth exponent α >0. Here, we examine how long-range interactions influence domain growth with disorder in dimensions D = 1 and D = 2. In D = 1, logarithmic growth is found to persist for various σ > 0. However, in D = 2, the dynamics is more complex due to the non-trivial interplay between extended interactions, disorder, and thermal fluctuations.