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发表于: 2020-06-15   点击: 

报告题目:Density of parabolic Anderson random variable

报 告 人:Professor Yaozhong Hu University of Alberta at Edmonton,Canada

报告时间:2020年6月16日 10:00-11:00

报告地点:钉钉会议ID:244 339 7399

校内联系人:韩月才 hanyc@jlu.edu.cn

报告摘要:

We investigate the shape the density $\rho(t,x; y)$ of the solution $u(t,x)$ to stochastic partial differential equation $\frac{\partial }{\partial t} u(t,x)=\frac12 \Delta u(t,x)+u\diamond \dot W(t,x)$, where $\dot W$ is a general Gaussian noise and $\diamond$ denotes the Wick product. We mainly concern with the asymptotic behavior of $\rho(t,x; y)$ when $y\rightarrow \infty$ or when $t\to0+$. Both upper and lower bounds are obtained and these two bounds match each other modulo some multiplicative constants. If the initial data is positive, then $\rho(t,x;y)$ is supported on the positive half line $y\in [0, \infty)$ and in this case we show that $\rho(t,x; 0+)=0$ and obtain an upper bound for $\rho(t,x; y)$ when $y\rightarrow 0+$.

报告人简介:

Yaozhong Hu is currently Centennial Professor at University of Alberta at Edmonton. He was elected as a Fellow of Institute of Mathematical Statistics. He now serves as associate editor of Stochastics and Stochastics Report, Acta Mathematica Scientia, and Journal of Applied Mathematics and Stochastic Analysis.