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TITLE
Ergodic theory of the stochastic Burgers equation
ABSTRACT
I am interested in stationary distributions for the Burgers equation with random forcing. I will first consider an oversimplified random dynamical system to illustrate the power of a general approach based on the so-called pullback procedure. For the Burgers equation, which is a basic evolutionary stochastic PDE of Hamilton-Jacobi type related to fluid dynamics, growth models, and the KPZ equation, one can realize this approach via studying long-term properties of random Lagrangian action minimizers and directed polymer measures in random environments. The compact space case was studied in 2000's. This talk is based on my work on the noncompact case, joint with Eric Cator, Kostya Khanin, Liying Li.
PLACE
CRM,聽Room 5340, Pavillon Andr茅 Aisenstadt Pavilion
ZOOM
ID: 842 2670 1306 / CODE: 692788
ORGANIZERS
Erica Moodie (缅北强奸)
Giovanni Rosso (Concordia University)
Alina Stancu (Concordia University)
Hugh R. Thomas (Universit茅 du Qu茅bec 脿 Montr茅al)
Guy Wolf (Universit茅 de Montr茅al)
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