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Abstract / Description of output
We study numerical methods for sampling probability measures in high dimension where the underlying model is only approximately identified with a gradient system. Extended stochastic dynamical methods are discussed which have application to multiscale models, nonequilibrium molecular dynamics, and Bayesian sampling techniques arising in emerging machine learning applications. In addition to providing a more comprehensive discussion of the foundations of these methods, we propose a new numerical method for the adaptive Langevin/stochastic gradient Nos\'{e}--Hoover thermostat that achieves a dramatic improvement in numerical efficiency over the most popular stochastic gradient methods reported in the literature. We also demonstrate that the newly established method inherits a superconvergence property (fourth order convergence to the invariant measure for configurational quantities) recently demonstrated in the setting of Langevin dynamics. Our findings are verified by numerical experiments.
Original language | English |
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Pages (from-to) | A712-A736 |
Number of pages | 25 |
Journal | SIAM Journal on Scientific Computing |
Volume | 38 |
Issue number | 2 |
DOIs | |
Publication status | Published - 1 Mar 2016 |
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Dive into the research topics of 'Adaptive Thermostats for Noisy Gradient Systems'. Together they form a unique fingerprint.Projects
- 1 Finished
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S12-CHE: ExSTASY: Extensible Tools for Advanced Sampling and analYsis
1/07/13 → 30/09/16
Project: Research
Profiles
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Benedict Leimkuhler
- School of Mathematics - Chair of Applied Mathematics
Person: Academic: Research Active