On the Approach to Equilibrium for a Polymer with Adsorption and Repulsion

Pietro Caputo (Universita Roma Tre)
Fabio Martinelli (Universita Roma Tre)
Fabio Lucio Toninelli (ENS Lyon)

Abstract


We consider paths of a one-dimensional simple random walk conditioned to come back to the origin after $L$ steps, $L\in 2\mathbb{N}$. In the pinning model each path $\eta$ has a weight $\lambda^{N(\eta)}$, where $\lambda>0$ and $N(\eta)$ is the number of zeros in $\eta$. When the paths are constrained to be non--negative, the polymer is said to satisfy a hard--wall constraint. Such models are well known to undergo a localization/delocalization transition as the pinning strength $\lambda$ is varied. In this paper we study a natural ``spin flip'' dynamics for %associated to these models and derive several estimates on its spectral gap and mixing time. In particular, for the system with the wall we prove that relaxation to equilibrium is always at least as fast as in the free case (\ie $\lambda=1$ without the wall), where the gap and the mixing time are known to scale as $L^{-2}$ and $L^2\log L$, respectively. This improves considerably over previously known results. For the system without the wall we show that the equilibrium phase transition has a clear dynamical manifestation: for $\lambda\geq 1$ relaxation is again at least as fast as the diffusive free case, but in the strictly delocalized phase ($\lambda<1$) the gap is shown to be $O(L^{-5/2})$, up to logarithmic corrections. As an application of our bounds, we prove stretched exponential relaxation of local functions in the localized regime.

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Pages: 213-258

Publication Date: February 22, 2008

DOI: 10.1214/EJP.v13-486

References

  1. K. Alexander, The effect of disorder on polymer depinning transitions , Commun. Math. Phys., to appear. (arxiv: math.PR/0610008). Math. Review number not available.
  2. T. Ambjornsson, S.K. Banik, M.A. Lomholt, R. Metzler, Master equation approach to DNA breathing in heteropolymer DNA, Phys. Rev. E 75 (2007), 021908. Math. Review number not available.
  3. A. Bar, Y. Kafri, D. Mukamel, Loop Dynamics in DNA Denaturation, Phys. Rev. Lett. 98 (2007), 038103. Math. Review number not available.
  4. T. Bodineau, F. Martinelli, Some new results on the kinetic Ising model in a pure phase, J. Statist. Phys. 109 (2002), 207--235. Math. Review MR1927919
  5. F. Caravenna, G. Giacomin and L. Zambotti, Sharp asymptotic behavior for wetting models in (1+1)-dimension, Electron. J. Probab. 11 (2006), 345--362. Math. Review MR2217821
  6. B. Derrida, V. Hakim and J. Vannimenus, Effect of disorder on two--dimensional wetting, J. Statist. Phys. 66 (1992), 1189--1213. Math. Review MR1156401
  7. J.-D. Deuschel, G. Giacomin and L. Zambotti, Scaling limits of equilibrium wetting models in (1+1)-dimension, Probab. Theory Rel. Fields 132 (2005), 471--500. Math. Review MR2198199
  8. W. Feller, An introduction to probability theory and its applications, Vol. I, 2nd edition, John Wiley and sons, 1966. Math. Review MR0228020
  9. M.E. Fisher, Walks, walls, wetting, and melting, J. Statist. Phys. 34 (1984), 667--729. Math. Review MR0751710
  10. D. Fisher and D. Huse, Dynamics of droplet fluctuation in pure and random ising systems , Phys. Rev. B, 35 (1987). Math. Review number not available.
  11. R. Fontes, R. Schonmann, V. Sidoravicious, Stretched exponential fixation in stochastic Ising models at zero temperature, Comm. Math. Phys. 228 (2002), 495--518. Math. Review MR2217821
  12. G. Giacomin, F. L. Toninelli, Smoothing effect of quenched disorder on polymer depinning transitions, Comm. Math. Phys. 266 (2006), 1--16. Math. Review MR2231963
  13. G. Giacomin and F.L. Toninelli, The localized phase of disordered copolymers with adsorption, ALEA 1 (2006), 149--180. Math. Review MR2249653
  14. G. Giacomin, Random polymer models, IC Press, World Scientific (2007). Math. Review number not available.
  15. T.P. Hayes, A. Sinclair, A general lower bound for mixing of single-site dynamics on graphs, Ann. Appl. Probab. 17 (2007), 931--952. Math. Review MR2326236
  16. Y. Isozaki, N. Yoshida, Weakly pinned random walk on the wall: pathwise description of the phase transition, Stoch. Proc. Appl. 96 (2001), 261--284. Math. Review MR1865758
  17. R. Martin, D. Randall, Disjoint decomposition of Markov chains and sampling circuits in Cayley graphs, Combin. Probab. Comput. 15 (2006), 411--448. Math. Review MR2216477
  18. R. Martin, D. Randall, Sampling adsorbing staircase walks using a new Markov chain decomposition method , 41st Annual Symposium on Foundations of Computer Science, 492--502, IEEE Comput.\ Soc.\ Pres (2000) Math. Review MR1931846
  19. L. Miclo, An example of application of discrete Hardy's inequalities, Markov Proc. Rel. Fields 5 (1999), 319-330. Math. Review MR1710983
  20. Y. Peres, Mixing for Markov chains and spin systems, draft of lecture notes available at author's web site. Math. Review number not available.
  21. F.L. Toninelli, A replica-coupling approach to disordered pinning models, Commun. Math. Phys., to appear. (arxiv: math-ph/0701063). Math. Review number not available.
  22. Y. Velenik, Localization and delocalization of random interfaces, Probability Surveys 3 (2006), 112-169. Math. Review MR2216964
  23. D.B. Wilson, Mixing times of Lozenge tiling and card shuffling Markov chains, Ann. Appl. Probab. 14 (2004), 274--325. Math. Review MR2023023
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