平特五不中

Event

Le Chen, University of Kansas

Tuesday, November 29, 2016 15:00
Burnside Hall Room 306, 805 rue Sherbrooke Ouest, Montreal, QC, H3A 0B9, CA

Stochastic heat equation: intermittency, densities and beyond

UPDATE:听BURNSIDE HALL ROOM 306 - 15:00

Abstract:听Stochastic heat equation (SHE) with multiplicative noise is an important model. When the diffusion coefficient is linear, this model is also called the parabolic Anderson model, the solution of which traditionally gives the Hopf-Cole solution to the famous KPZ equation. Obtaining various fine properties of its solution will certainly deepen our understanding of these important models. In this talk, I will highlight several interesting properties of SHE and then focus on the probability densities of the solution. In a recent joint work with Y. Hu and D. Nualart, we establish a necessary and sufficient condition for the existence and regularity of the density of the solution to SHE with measure-valued initial conditions. Under a mild cone condition for the diffusion coefficient, we establish the smooth joint density at multiple points. The tool we use is Malliavin calculus. The main ingredient is to prove that the solutions to a related stochastic partial differential equation have negative moments of all orders.

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