Directed polymers in a random medium: a variational approach
Abstract
A disorder-dependent Gaussian variational approach is applied to the problem of a dimensional polymer chain in a random medium (or potential). Two classes of variational solutions are obtained. For , these two classes may be interpreted as domain and domain wall. The critical exponent describing the polymer width is (domain solution) or (domain wall solution). The domain wall solution is equivalent to the (full) replica symmetry breaking variational result. For , we find . No evidence of a phase transition is found for : one of the variational solutions suggests that the polymer chain breaks into Imry-Ma segments, whose probability distribution is calculated. For , the other variational solution undergoes a phase transition, which has some similarity with B. Derrida's random energy models.
Cite
@article{arxiv.cond-mat/9603159,
title = {Directed polymers in a random medium: a variational approach},
author = {T. Garel and H. Orland},
journal= {arXiv preprint arXiv:cond-mat/9603159},
year = {2009}
}
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