Gilles Lebeau, Laurent Michel
Published 2013-04-25Version 1
We study the spectral theory of a reversible Markov chain associated to a hypoelliptic random walk on a manifold M. This random walk depends on a parameter h which is roughly the size of each step of the walk. We prove uniform bounds with respect to h on the rate of convergence to equilibrium, and the convergence when h goes to zero to the associated hypoelliptic diffusion.
Spectral analysis of semigroups and growth-fragmentation equations
Invariant subspaces of elliptic systems II: spectral theory
Spectral analysis of the discrete Maxwell operator: The limiting absorption principle
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