TY - BOOK AU - AU - ED - SpringerLink (Online service) TI - Instability in Models Connected with Fluid Flows I T2 - International Mathematical Series, SN - 9780387752174 AV - QA299.6-433 U1 - 515 23 PY - 2008/// CY - New York, NY PB - Springer New York KW - Mathematics KW - Global analysis (Mathematics) KW - Differential equations, partial KW - Computer science KW - Mathematical optimization KW - Thermodynamics KW - Mechanics, applied KW - Analysis KW - Calculus of Variations and Optimal Control; Optimization KW - Computational Mathematics and Numerical Analysis KW - Partial Differential Equations KW - Theoretical and Applied Mechanics KW - Mechanics, Fluids, Thermodynamics N1 - Solid Controllability in Fluid Dynamics -- Analyticity of Periodic Solutions of the 2D Boussinesq System -- Nonlinear Dynamics of a System of Particle-Like Wavepackets -- Attractors for Nonautonomous NavierStokes System and Other Partial Differential Equations -- Recent Results in Large Amplitude Monophase Nonlinear Geometric Optics -- Existence Theorems for the 3DNavierStokes System Having as Initial Conditions Sums of Plane Waves -- Bursting Dynamics of the 3D Euler Equations in Cylindrical Domains -- Increased Stability in the Cauchy Problem for Some Elliptic Equations; ZDB-2-SMA N2 - Instability in Models Connected with Fluid Flows I presents chapters from world renowned specialists. The stability of mathematical models simulating physical processes is discussed in topics on control theory, first order linear and nonlinear equations, water waves, free boundary problems, large time asymptotics of solutions, stochastic equations, Euler equations, Navier-Stokes equations, and other PDEs of fluid mechanics. Fields covered include: controllability and accessibility properties of the Navier- Stokes and Euler systems, nonlinear dynamics of particle-like wavepackets, attractors of nonautonomous Navier-Stokes systems, large amplitude monophase nonlinear geometric optics, existence results for 3D Navier-Stokes equations and smoothness results for 2D Boussinesq equations, instability of incompressible Euler equations, increased stability in the Cauchy problem for elliptic equations. Contributors include: Andrey Agrachev (Italy-Russia) and Andrey Sarychev (Italy); Maxim Arnold (Russia); Anatoli Babin (USA) and Alexander Figotin (USA); Vladimir Chepyzhov (Russia) and Mark Vishik (Russia); Christophe Cheverry (France); Efim Dinaburg (Russia) and Yakov Sinai (USA-Russia); Francois Golse (France), Alex Mahalov (USA), and Basil Nicolaenko (USA); Victor Isakov (USA) UR - http://dx.doi.org/10.1007/978-0-387-75217-4 ER -