Colloquium

From: BrendaSueCook (brenda@math.missouri.edu)
Date: Fri Apr 13 2007 - 12:41:05 CDT

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Colloquium
Department of Mathematics

A.V. Fursikov
Moscow State University

Stabilization of the Navier-Stokes
equations with the help
 of a boundary feed-back control

Abstract:

Let $\hat v$ be an unstable steady-state solution of the Navier-Stokes
 equations
 on a bounded domain $\Omega$. The stabilization problem consists of
 finding
a Dirichlet boundary control for a given initial condition $v_0$ close to
$\hat v$ such that the solution of the resulting boundary value problem tends
exponentially
 to $\hat v$ as $t \to \infty$.

The control should satisfy the feed-back property, i.e. it should react
to unpredictable fluctuations of a solution by damping them.

 In this talk we shall present the construction of such a feed-back control,
the stabilization mechanism, and the retention of the the stabilized
 solution
 near $\hat v$. We will also present some initial steps towards the
 solution
 of the non-local stabilization problem (when the initial condition $v_0$
 is not
close to $\hat v$).

Thursday, April 19
3:30 p.m.
114 General Classroom Building

Refreshments will be served at 3:00 p.m.
in Room 326 Mathematical Sciences (Math Lounge).

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