Chien-Hao Huang
Published 2014-08-04Version 1
We consider a statistical mechanics model for biopolymers. Sophisticated polymer chains, such as DNA, have stiffness when they stretch chains. The Laplacian interaction is used to describe the stiffness. Also, the surface between two media has an attraction force, and the force will pull the chain back to the surface. In this paper, we deal with the random potentials when the monomers interact with the random media. Although these models are different from the pinning models studied before, the result about the gap between the annealed critical point and the quenched critical point stays the same.
Comments: 18 pages. It's a revision of part of arXiv:1211.3768
Random potentials for pinning models with \nabla and Δinteractions
Pinning and wetting transition for (1+1)-dimensional fields with Laplacian interaction
On the continuity of lyapunov exponents of random walks in random potentials
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