Resistance forms, quasisymmetric maps and heat kernel estimates
Author(s)
Bibliographic Information
Resistance forms, quasisymmetric maps and heat kernel estimates
(Memoirs of the American Mathematical Society, no. 1015)
American Mathematical Society, 2012, c2011
Available at / 11 libraries
-
No Libraries matched.
- Remove all filters.
Note
"March 2012, volume 216, number 1015 (first of 4 numbers)"--T.p
Includes bibliography (p. 123-125) and index
Description and Table of Contents
Description
Assume that there is some analytic structure, a differential equation or a stochastic process for example, on a metric space. To describe asymptotic behaviors of analytic objects, the original metric of the space may not be the best one. Every now and then one can construct a better metric which is somehow ``intrinsic'' with respect to the analytic structure and under which asymptotic behaviors of the analytic objects have nice expressions. The problem is when and how one can find such a metric. In this paper, the author considers the above problem in the case of stochastic processes associated with Dirichlet forms derived from resistance forms. The author's main concerns are the following two problems: (I) When and how to find a metric which is suitable for describing asymptotic behaviors of the heat kernels associated with such processes. (II) What kind of requirement for jumps of a process is necessary to ensure good asymptotic behaviors of the heat kernels associated with such processes.
by "Nielsen BookData"