Functional inequalities for a family of infinite-dimensional diffusions with degenerate noise

Fabrice Baudoin; Maria Gordina; David Herzog; Jina Kim; Tai Melcher

Functional inequalities for a family of infinite-dimensional diffusions with degenerate noise

Fabrice Baudoin, Maria Gordina, David Herzog, Jina Kim, Tai Melcher

Department of Mathematics

Research output: Working paper/Preprint › Preprint

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Abstract

For a family of infinite-dimensional diffusions with degenerate noise, we develop a modified $\Gamma$ calculus on finite-dimensional projections of the equation in order to produce explicit functional inequalities that can be scaled to infinite dimensions. The choice of our $\Gamma$ operator appears canonical in our context, as the estimates depend only on the induced control distance. We apply the general analysis to a number of examples, exploring implications for quasi-invariance and uniqueness of stationary distributions.

Original language	Undefined/Unknown
Publication status	Published - 2 Nov 2023

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2311.01440v1

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Cite this

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abstract = "For a family of infinite-dimensional diffusions with degenerate noise, we develop a modified $\Gamma$ calculus on finite-dimensional projections of the equation in order to produce explicit functional inequalities that can be scaled to infinite dimensions. The choice of our $\Gamma$ operator appears canonical in our context, as the estimates depend only on the induced control distance. We apply the general analysis to a number of examples, exploring implications for quasi-invariance and uniqueness of stationary distributions.",

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AU - Gordina, Maria

AU - Herzog, David

AU - Kim, Jina

AU - Melcher, Tai

N1 - 35 pages

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N2 - For a family of infinite-dimensional diffusions with degenerate noise, we develop a modified $\Gamma$ calculus on finite-dimensional projections of the equation in order to produce explicit functional inequalities that can be scaled to infinite dimensions. The choice of our $\Gamma$ operator appears canonical in our context, as the estimates depend only on the induced control distance. We apply the general analysis to a number of examples, exploring implications for quasi-invariance and uniqueness of stationary distributions.

AB - For a family of infinite-dimensional diffusions with degenerate noise, we develop a modified $\Gamma$ calculus on finite-dimensional projections of the equation in order to produce explicit functional inequalities that can be scaled to infinite dimensions. The choice of our $\Gamma$ operator appears canonical in our context, as the estimates depend only on the induced control distance. We apply the general analysis to a number of examples, exploring implications for quasi-invariance and uniqueness of stationary distributions.

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BT - Functional inequalities for a family of infinite-dimensional diffusions with degenerate noise

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