This important book explains how the technique of Witten Laplacians may be useful in statistical mechanics. It considers the problem of analyzing the decay of correlations, after presenting its origin in statistical mechanics. In addition, it compares the Witten Laplacian approach with other techniques, such as the transfer matrix approach and its semiclassical analysis. The author concludes by providing a complete proof of the uniform Log–Sobolev inequality.
Contents:
- Witten Laplacians Approach
- Problems in Statistical Mechanics with Discrete Spins
- Laplace Integrals and Transfer Operators
- Semi-Classical Analysis for the Transfer Operators
- Basic Facts in Spectral Theory and on the Schrödinger Operator
- Log-Sobolev Inequalities
- Uniform Decay of Correlations
- Uniform Log-Sobolev Inequalities
Readership: Graduate students and researchers in the fields of partial differential equations, mathematical physics and statistical physics.
