中文

Exploratory Behavior, Trap Models and Glass Transitions

无序系统与神经网络 2010-07-20 v3 统计力学

摘要

A random walk is performed on a disordered landscape composed of NN sites randomly and uniformly distributed inside a dd-dimensional hypercube. The walker hops from one site to another with probability proportional to exp[βE(D)]\exp [- \beta E(D)], where β=1/T\beta = 1/T is the inverse of a formal temperature and E(D)E(D) is an arbitrary cost function which depends on the hop distance DD. Analytic results indicate that, if E(D)=DdE(D) = D^{d} and NN \to \infty, there exists a glass transition at βd=πd/2/Γ(d/2+1)\beta_d = \pi^{d/2}/\Gamma(d/2 + 1). Below TdT_d, the average trapping time diverges and the system falls into an out-of-equilibrium regime with aging phenomena. A L\'evy flight scenario and applications to exploratory behavior are considered.

关键词

引用

@article{arxiv.cond-mat/0210563,
  title  = {Exploratory Behavior, Trap Models and Glass Transitions},
  author = {Alexandre S. Martinez and Osame Kinouchi and Sebastian Risau-Gusman},
  journal= {arXiv preprint arXiv:cond-mat/0210563},
  year   = {2010}
}

备注

4 pages, 1 figure, new version