A periodic elastic medium in which periodicity is relevant
Abstract
We analyze, in both (1+1)- and (2+1)- dimensions, a periodic elastic medium in which the periodicity is such that at long distances the behavior is always in the random-substrate universality class. This contrasts with the models with an additive periodic potential in which, according to the field theoretic analysis of Bouchaud and Georges and more recently of Emig and Nattermann, the random manifold class dominates at long distances in (1+1)- and (2+1)-dimensions. The models we use are random-bond Ising interfaces in hypercubic lattices. The exchange constants are random in a slab of size Ld-1 × λ and these coupling constants are periodically repeated along either 10 or 11 (in (1+1)-dimensions) and 100 or 111 (in (2+1)-dimensions). Exact ground-state calculations confirm scaling arguments which predict that the surface roughness w behaves as: w L2/3, L Lc and w L1/2, L Lc, with Lc λ3/2 in (1+1)-dimensions and; w L0.42, L Lc and w (L), L Lc, with Lc λ2.38 in (2+1)-dimensions.
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