Gibbsian dynamics and the generalized Langevin equation

dc.contributor.author

Herzog, DP

dc.contributor.author

Mattingly, JC

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Nguyen, HD

dc.date.accessioned

2021-12-05T02:42:24Z

dc.date.available

2021-12-05T02:42:24Z

dc.date.updated

2021-12-05T02:42:23Z

dc.description.abstract

We study the statistically invariant structures of the nonlinear generalized Langevin equation (GLE) with a power-law memory kernel. For a broad class of memory kernels, including those in the subdiffusive regime, we construct solutions of the GLE using a Gibbsian framework, which does not rely on existing Markovian approximations. Moreover, we provide conditions on the decay of the memory to ensure uniqueness of statistically steady states, generalizing previous known results for the GLE under particular kernels as a sum of exponentials.

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https://hdl.handle.net/10161/24045

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Institute of Mathematical Statistics

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math.PR

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math.PR

dc.title

Gibbsian dynamics and the generalized Langevin equation

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Journal article

duke.contributor.orcid

Mattingly, JC|0000-0002-1819-729X

pubs.organisational-group

Trinity College of Arts & Sciences

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Mathematics

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Statistical Science

pubs.organisational-group

Duke

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