- Exponential dichotomy and timebounded solutions for firstorder hyperbolic systems #
- Some limiting properties of randomly forced 2D NavierStokes equations
- BANACH CENTER PUBLICATIONS, VOLUME 60 INSTITUTE OF MATHEMATICS
- Some limiting properties of randomly forced 2D Navier--Stokes equations
- BANACH CENTER PUBLICATIONS, VOLUME 60 INSTITUTE OF MATHEMATICS
- Law of large numbers and central limit theorem for randomly forced PDE's
- Exponential mixing for 2D Navier--Stokes equations perturbed by an unbounded noise
- Russian Journal of Mathematical Physics, Vol. 12, No. 1, 2005, pp. 81--95. Copyright c
- A coupling approach to randomly forced nonlinear PDE's. I
- Euler equations are not exactly controllable by a finite-dimensional external force
- DISCRETE AND CONTINUOUS Website: http://AIMsciences.org DYNAMICAL SYSTEMS
- Ergodicity for the randomly forced 2D Navier--Stokes equations
- Approximate controllability of threedimensional Navier--Stokes equations
- Manuscript submitted to Website: http://AIMsciences.org AIMS' Journals
- Exponential mixing for randomly forced PDE's: method of coupling
- Ergodicity for the randomly forced 2D NavierStokes equations
- A coupling approach to randomly forced nonlinear PDE's. I
- A coupling approach to randomly forced nonlinear PDE's. II
- Exponential dichotomy and time-bounded solutions for first-order hyperbolic systems
- Coupling approach to white-forced nonlinear PDE's.
- On random attractors for mixing-type systems Sergei Kuksin
- Copyright c 2005 by MAIK "Nauka/Interperiodica" (Russia). Dedicated to Leonid Romanovich Volevich on the occasion of his seventieth birthday
- Law of large numbers and central limit theorem for randomly forced PDE's
- Qualitative properties of stationary measures for three-dimensional NavierStokes equations
- Local times for solutions of the complex GinzburgLandau equation and the inviscid limit
- INTERNAL EXPONENTIAL STABILIZATION TO A NON-STATIONARY SOLUTION FOR 3D NAVIERSTOKES
- February 16, 2006 13:44 WSPC/Trim Size: 10in x 7in for Proceedings icmp2003 SOME MATHEMATICAL PROBLEMS OF STATISTICAL
- Controllability of nonlinear PDE's: AgrachevSarychev approach
- Izvestiya:M athematics 64:3 439--485 c #20 0 0 RAS(DoM) and LMS
- February 16, 2006 13:44 WSPC/Trim Size: 10in x 7in for Proceedings icmp2003 SOME MATHEMATICAL PROBLEMS OF STATISTICAL
- A coupling approach to randomly forced nonlinear PDE's. II
- Exact controllability in projections for three-dimensional NavierStokes equations
- Manuscript submitted to Website: http://AIMsciences.org AIMS' Journals
- Exact controllability in projections for threedimensional Navier--Stokes equations
- DISCRETE AND CONTINUOUS Website: http://AIMsciences.org DYNAMICAL SYSTEMS
- February 16, 2006 14:2 WSPC/Trim Size: 9in x 6in for Proceedings swansea2002 A VERSION OF THE LAW OF LARGE NUMBERS AND
- Randomly forced CGL equation: stationary measures and the inviscid limit
- Izvestiya: Mathematics 64:3 439485 c 2000 RAS(DoM) and LMS Izvestiya RAN: Ser. Mat. 64:3 350 DOI 10.1070/IM2000v064n03ABEH000288
- Controllability of three-dimensional NavierStokes equations and applications
- On finite-dimensional projections of distributions for solutions of randomly forced PDE's
- Stochastic dissipative PDE's and Gibbs measures Sergei Kuksin Armen Shirikyan
- Controllability of threedimensional Navier--Stokes equations and applications
- On random attractors for mixingtype systems Sergei Kuksin # Armen Shirikyan +
- On dissipative systems perturbed by bounded random kickforces
- Randomly forced CGL equation: stationary measures and the inviscid limit
- February 16, 2006 14:2 WSPC/Trim Size: 9in x 6in for Proceedings swansea2002 A VERSION OF THE LAW OF LARGE NUMBERS AND
- Stochastic dissipative PDE's and Gibbs measures Sergei Kuksin Armen Shirikyan
- Approximate controllability of three-dimensional NavierStokes equations
- Coupling approach to whiteforced nonlinear PDE's.
- On dissipative systems perturbed by bounded random kick-forces
- Exponential mixing for 2D NavierStokes equations perturbed by an unbounded noise