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Random Walks on Disordered Media and their Scaling Limits

École d'Été de Probabilités de Saint-Flour XL - 2010

  • Book
  • © 2014

Overview

Authors:
  1. Takashi Kumagai

    1. Research Institute for Mathematical Scie, Kyoto University, Kyoto, Japan

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  • Starts from basics on discrete potential theory
  • Contains many interesting examples of disordered media with anomalous heat conduction
  • Anomalous behavior of random walk at criticality on random media
  • Contains recent developments on random conductance models
  • Includes supplementary material: sn.pub/extras

Part of the book series: Lecture Notes in Mathematics (LNM, volume 2101)

Part of the book sub series: École d'Été de Probabilités de Saint-Flour (LNMECOLE)

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Table of contents (8 chapters)

  1. Front Matter

    Pages i-x
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  2. Introduction

    • Takashi Kumagai
    Pages 1-2

  3. Weighted Graphs and the Associated Markov Chains

    • Takashi Kumagai
    Pages 3-19

  4. Heat Kernel Estimates: General Theory

    • Takashi Kumagai
    Pages 21-41

  5. Heat Kernel Estimates Using Effective Resistance

    • Takashi Kumagai
    Pages 43-58

  6. Heat Kernel Estimates for Random Weighted Graphs

    • Takashi Kumagai
    Pages 59-64

  7. Alexander–Orbach Conjecture Holds When Two-Point Functions Behave Nicely

    • Takashi Kumagai
    Pages 65-77

  8. Further Results for Random Walk on IIC

    • Takashi Kumagai
    Pages 79-93

  9. Random Conductance Model

    • Takashi Kumagai
    Pages 95-134

  10. Back Matter

    Pages 135-150
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Keywords

About this book

In these lecture notes, we will analyze the behavior of random walk on disordered media by means of both probabilistic and analytic methods, and will study the scaling limits. We will focus on the discrete potential theory and how the theory is effectively used in the analysis of disordered media. The first few chapters of the notes can be used as an introduction to discrete potential theory.
Recently, there has been significant progress on the theory of random walk on disordered media such as fractals and random media. Random walk on a percolation cluster(‘the ant in the labyrinth’)is one of the typical examples. In 1986, H. Kesten showed the anomalous behavior of a random walk on a percolation cluster at critical probability. Partly motivated by this work, analysis and diffusion processes on fractals have been developed since the late eighties. As a result, various new methods have been produced to estimate heat kernels on disordered media. These developments are summarized in the notes.

Authors and Affiliations

  • Research Institute for Mathematical Scie, Kyoto University, Kyoto, Japan

    Takashi Kumagai

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