Weak Poincaré Inequalities and L2-Convergence Rates of Markov Semigroups
✍ Scribed by Michael Röckner; Feng-Yu Wang
- Publisher
- Elsevier Science
- Year
- 2001
- Tongue
- English
- Weight
- 293 KB
- Volume
- 185
- Category
- Article
- ISSN
- 0022-1236
No coin nor oath required. For personal study only.
✦ Synopsis
In order to describe L 2 -convergence rates slower than exponential, the weak Poincare inequality is introduced. It is shown that the convergence rate of a Markov semigroup and the corresponding weak Poincare inequality can be determined by each other. Conditions for the weak Poincare inequality to hold are presented, which are easy to check and which hold in many applications. The weak Poincare inequality is also studied by using isoperimetric inequalities for diffusion and jump processes. Some typical examples are given to illustrate the general results. In particular, our results are applied to the stochastic quantization of field theory in finite volume. Moreover, a sharp criterion of weak Poincare inequalities is presented for Poisson measures on configuration spaces.