Spatial Stochastic Processes

A Festschrift in Honor of Ted Harris on his Seventieth Birthday

  • Kenneth S. Alexander
  • Joseph C. Watkins

Part of the Progress in Probability book series (PRPR, volume 19)

Table of contents

  1. Front Matter
    Pages i-xii
  2. Branching Processes

    1. Front Matter
      Pages 1-1
    2. Peter Ney
      Pages 3-22
  3. Percolation

    1. Front Matter
      Pages 35-35
    2. David J. Barsky, Geoffrey R. Grimmett, Charles M. Newman
      Pages 37-55
  4. Interacting Particle Systems

  5. Stochastic Flows

  6. Back Matter
    Pages 257-258

About this book


This volume has been created in honor of the seventieth birthday of Ted Harris, which was celebrated on January 11th, 1989. The papers rep­ resent the wide range of subfields of probability theory in which Ted has made profound and fundamental contributions. This breadth in Ted's research complicates the task of putting together in his honor a book with a unified theme. One common thread noted was the spatial, or geometric, aspect of the phenomena Ted investigated. This volume has been organized around that theme, with papers covering four major subject areas of Ted's research: branching processes, percola­ tion, interacting particle systems, and stochastic flows. These four topics do not· exhaust his research interests; his major work on Markov chains is commemorated in the standard technology "Harris chain" and "Harris recurrent" . The editors would like to take this opportunity to thank the speakers at the symposium and the contributors to this volume. Their enthusi­ astic support is a tribute to Ted Harris. We would like to express our appreciation to Annette Mosley for her efforts in typing the manuscripts and to Arthur Ogawa for typesetting the volume. Finally, we gratefully acknowledge the National Science Foundation and the University of South­ ern California for their financial support.


Branching process Harris chain Markov chain Probability theory Stochastic processes branching random walk contact process correlation interacting particle system random walk stochastic process

Editors and affiliations

  • Kenneth S. Alexander
    • 1
  • Joseph C. Watkins
    • 1
  1. 1.Department of MathematicsUniversity of Southern CaliforniaLos Angeles

Bibliographic information