Moderate Deviation for Random Elliptic PDEs with Small Noise

dc.contributor.author

Li, X

dc.contributor.author

Liu, J

dc.contributor.author

Lu, J

dc.contributor.author

Zhou, X

dc.date.accessioned

2017-04-23T15:44:08Z

dc.date.available

2017-04-23T15:44:08Z

dc.date.issued

2017-04-23

dc.description.abstract

Partial differential equations with random inputs have become popular models to characterize physical systems with uncertainty coming from, e.g., imprecise measurement and intrinsic randomness. In this paper, we perform asymptotic rare event analysis for such elliptic PDEs with random inputs. In particular, we consider the asymptotic regime that the noise level converges to zero suggesting that the system uncertainty is low, but does exists. We develop sharp approximations of the probability of a large class of rare events.

dc.identifier

http://arxiv.org/abs/1703.05285v2

dc.identifier.uri

https://hdl.handle.net/10161/14053

dc.publisher

Institute of Mathematical Statistics

dc.subject

math.PR

dc.subject

math.PR

dc.title

Moderate Deviation for Random Elliptic PDEs with Small Noise

dc.type

Journal article

duke.contributor.orcid

Lu, J|0000-0001-6255-5165

pubs.author-url

http://arxiv.org/abs/1703.05285v2

pubs.organisational-group

Chemistry

pubs.organisational-group

Duke

pubs.organisational-group

Mathematics

pubs.organisational-group

Physics

pubs.organisational-group

Trinity College of Arts & Sciences

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