Discontinuous Interface Depinning from a Rough Wall
Abstract
Depinning of an interface from a random self--affine substrate with roughness exponent is studied in systems with short--range interactions. In 2 transfer matrix results show that for depinning falls in the universality class of the flat case. When exceeds the roughness () of the interface in the bulk, geometrical disorder becomes relevant and, moreover, depinning becomes \underline{discontinuous}. The same unexpected scenario, and a precise location of the associated tricritical point, are obtained for a simplified hierarchical model. It is inferred that, in 3, with , depinning turns first--order already for . Thus critical wetting may be impossible to observe on rough substrates.
Cite
@article{arxiv.cond-mat/9507123,
title = {Discontinuous Interface Depinning from a Rough Wall},
author = {G. Giugliarelli and A. L. Stella},
journal= {arXiv preprint arXiv:cond-mat/9507123},
year = {2009}
}
Comments
REVTeX (9 pages), 4 postscript figures, tarred, gzipped, uuencoded using `uufiles', coming with a separate file. Some revisions of abstract and results discussion and their theoretical and experimental implications have been done