PDE Geometric Analysis seminar: Difference between revisions
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We prove interior Holder estimates for the spatial gradient of viscosity solutions to the parabolic homogeneous p-Laplacian equation | We prove interior Holder estimates for the spatial gradient of viscosity solutions to the parabolic homogeneous p-Laplacian equation | ||
u_t=|\nabla u|^{2-p} div(|\nabla u|^{p-2}\nabla u), | |||
where 1<p<\infty. This equation arises from tug-of-war like stochastic games with white noise. It can also be considered as the parabolic p-Laplacian equation in non divergence form. This is joint work with Luis Silvestre. | where 1<p<\infty. This equation arises from tug-of-war like stochastic games with white noise. It can also be considered as the parabolic p-Laplacian equation in non divergence form. This is joint work with Luis Silvestre. |
Revision as of 21:22, 6 January 2016
The seminar will be held in room 901 of Van Vleck Hall on Mondays from 3:30pm - 4:30pm, unless indicated otherwise.
Previous PDE/GA seminars
Tentative schedule for Fall 2016
Seminar Schedule Spring 2016
date | speaker | title | host(s) |
---|---|---|---|
January 25 | Tianling Jin (HKUST and Caltech) | Holder gradient estimates for parabolic homogeneous p-Laplacian equations | Zlatos |
February 1 | Russell Schwab (Michigan State University) | TBA | Lin |
February 8 | Jingrui Cheng (UW Madison) | ||
February 15 | |||
February 22 | Hong Zhang (Brown) | Kim | |
February 29 | Aaron Yip (Purdue university) | TBD | Tran |
March 7 | Hiroyoshi Mitake (Hiroshima university) | TBD | Tran |
March 15 | Nestor Guillen (UMass Amherst) | TBA | Lin |
March 21 (Spring Break) | |||
March 28 | Ryan Denlinger (Courant Institute) | TBA | Lee |
April 4 | |||
April 11 | |||
April 18 | |||
April 25 | Moon-Jin Kang (UT-Austin) | Kim | |
May 2 |
Abstracts
Tianling Jin
Holder gradient estimates for parabolic homogeneous p-Laplacian equations
We prove interior Holder estimates for the spatial gradient of viscosity solutions to the parabolic homogeneous p-Laplacian equation u_t=|\nabla u|^{2-p} div(|\nabla u|^{p-2}\nabla u), where 1<p<\infty. This equation arises from tug-of-war like stochastic games with white noise. It can also be considered as the parabolic p-Laplacian equation in non divergence form. This is joint work with Luis Silvestre.