Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function
Röckner M, Wu W, Xie Y (2024)
Potential Analysis.
Zeitschriftenaufsatz
| E-Veröff. vor dem Druck | Englisch
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Autor*in
Röckner, MichaelUniBi;
Wu, Weina;
Xie, Yingchao
Einrichtung
Abstract / Bemerkung
In this paper, we prove that stochastic porous media equations over sigma-finite measure spaces (E,B, mu), driven by time-dependent multiplicative noise, with the Laplacian replaced by a self-adjoint transient Dirichlet operator L and the diffusivity function given by a maximal monotone multi-valued function Psi of polynomial growth, have a unique solution. This generalizes previous results in that we work on general measurable state spaces, allow non-continuous monotone functions Psi, for which, no further assumptions (as e.g. coercivity) are needed, but only that their multi-valued extensions are maximal monotone and of at most polynomial growth. Furthermore, an L-P(mu)-It & ocirc; formula in expectation is proved, which is not only crucial for the proof of our main result, but also of independent interest. The result in particular applies to fast diffusion stochastic porous media equations (in particular self-organized criticality models) and cases where E is a manifold or a fractal, and to non-local operators L, as e.g. L=-f(-Delta), where f is a Bernstein function.
Stichworte
Wiener process;
Porous media equation;
Dirichlet form;
Maximal monotone;
graph;
Yosida approximation;
L-P(mu)-It & ocirc;
formula in expectation
Erscheinungsjahr
2024
Zeitschriftentitel
Potential Analysis
ISSN
0926-2601
eISSN
1572-929X
Page URI
https://pub.uni-bielefeld.de/record/2988233
Zitieren
Röckner M, Wu W, Xie Y. Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function. Potential Analysis. 2024.
Röckner, M., Wu, W., & Xie, Y. (2024). Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function. Potential Analysis. https://doi.org/10.1007/s11118-024-10127-7
Röckner, Michael, Wu, Weina, and Xie, Yingchao. 2024. “Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function”. Potential Analysis.
Röckner, M., Wu, W., and Xie, Y. (2024). Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function. Potential Analysis.
Röckner, M., Wu, W., & Xie, Y., 2024. Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function. Potential Analysis.
M. Röckner, W. Wu, and Y. Xie, “Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function”, Potential Analysis, 2024.
Röckner, M., Wu, W., Xie, Y.: Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function. Potential Analysis. (2024).
Röckner, Michael, Wu, Weina, and Xie, Yingchao. “Stochastic Generalized Porous Media Equations Over σ-finiteMeasure Spaces with Non-continuous Diffusivity Function”. Potential Analysis (2024).
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