Dmitry Ioffe, Yvan Velenik
Published 2007-10-16, updated 2008-04-03Version 2
We explain a unified approach to a study of ballistic phase for a large family of self-interacting random walks with a drift and self-interacting polymers with an external stretching force. The approach is based on a recent version of the Ornstein-Zernike theory developed in earlier works. It leads to local limit results for various observables (e.g. displacement of the end-point or number of hits of a fixed finite pattern) on paths of n-step walks (polymers) on all possible deviation scales from CLT to LD. The class of models, which display ballistic phase in the "universality class" discussed in the paper, includes self-avoiding walks, Domb-Joyce model, random walks in an annealed random potential, reinforced polymers and weakly reinforced random walks.
Comments: One picture and a few annoying typos corrected. Version to be published
Journal: "Analysis and stochastics of growth processes and interface models", Oxford: Oxford Univ. Press (2008) , p. 55--79
Eigenvalue vs perimeter in a shape theorem for self-interacting random walks
Self-interacting random walks
On the range of self-interacting random walks on an integer interval
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