On explicit $L^2$-convergence rate estimate for piecewise deterministic Markov processes
Abstract
We establish $L^2$-exponential convergence rate for three popular piecewise
deterministic Markov processes for sampling: the randomized Hamiltonian Monte
Carlo method, the zigzag process, and the bouncy particle sampler. Our analysis
is based on a variational framework for hypocoercivity, which combines a
Poincar\'{e}-type inequality in time-augmented state space and a standard $L^2$
energy estimate. Our analysis provides explicit convergence rate estimates,
which are more quantitative than existing results.
Type
Journal articlePermalink
https://hdl.handle.net/10161/21932Collections
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Show full item recordScholars@Duke
Jianfeng Lu
Professor of Mathematics
Jianfeng Lu is an applied mathematician interested in mathematical analysis and algorithm
development for problems from computational physics, theoretical chemistry, materials
science and other related fields.More specifically, his current research focuses include:Electronic
structure and many body problems; quantum molecular dynamics; multiscale modeling
and analysis; rare events and sampling techniques.
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