Directed polymers in a random medium: a variational approach
Abstract
A disorder-dependent Gaussian variational approach is applied to the problem of a d dimensional polymer chain in a random medium (or potential). Two classes of variational solutions are obtained. For d<2, these two classes may be interpreted as domain and domain wall. The critical exponent describing the polymer width is =1 (4-d) (domain solution) or =3 (d+4) (domain wall solution). The domain wall solution is equivalent to the (full) replica symmetry breaking variational result. For d>2, we find =1 2. No evidence of a phase transition is found for 2< d< 4: one of the variational solutions suggests that the polymer chain breaks into Imry-Ma segments, whose probability distribution is calculated. For d>4, the other variational solution undergoes a phase transition, which has some similarity with B. Derrida's random energy models.
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