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Wang, Xiaoming - Department of Mathematics, Florida State University
Infinite Prandtl Number Limit of Rayleigh-Benard Convection
Asymptotic Behavior of the Global Attractors to the Boussinesq System for Rayleigh-Bnard Convection
DISCRETE AND CONTINUOUS doi:10.3934/dcds.2009.23.521 DYNAMICAL SYSTEMS
The general area of geophysical fluid mechanics is truly interdisciplinary. Ideas from statistical physics are now being applied in novel ways to
Contemporary Mathematics A Note on Long Time Behavior of Solutions to the
BOUNDARY LAYERS ASSOCIATED WITH INCOMPRESSIBLE NAVIER-STOKES EQUATIONS: THE NONCHARACTERISTIC
The Emergence of Large-Scale Coherent Structure under Small-Scale Random Bombardments
A Kato Type Theorem on Zero Viscosity Limit of Navier-Stokes Flows
REMARKS ON THE PRANDTL EQUATION FOR A PERMEABLE WALL
Linear Response Theory for Statistical Ensembles in Complex Systems with Time-Periodic Forcing
Well-posedness of the Infinite Prandtl Number Model for Convection with Temperature-Dependent Viscosity
Chin. Ann. Math. ??B(?), 2010, 120
Well-posedness of the Hele-Shaw-Cahn-Hilliard system Xiaoming Wang
TenLessonsIWishIHad Gian-Carlo Rota
Accepted Manuscript Bound on vertical heat transport at large Prandtl number
APPROXIMATION OF THE STATIONARY STATISTICAL PROPERTIES OF THE DYNAMICAL
BOUNDARY LAYER ASSOCIATED WITH A CLASS OF 3D NONLINEAR PLANE PARALLEL CHANNEL FLOWS
PROOF COPY 210706JMP Discrete Kato-type theorem on inviscid limit
BOUNDARY LAYER ASSOCIATED WITH THE DARCY-BRINKMAN-BOUSSINESQ MODEL FOR
A SEMI-IMPLICIT SCHEME FOR STATIONARY STATISTICAL PROPERTIES OF THE INFINITE PRANDTL NUMBER MODEL
Stationary Statistical Properties of Rayleigh-Bnard Convection
A linear energy stable scheme for a thin film model without slope selection
AN EFFICIENT SECOND ORDER IN TIME SCHEME FOR APPROXIMATING LONG TIME STATISTICAL PROPERTIES OF
Calibrating the exchange coefficient in the modified1 coupled continuum pipe-flow model for flows in2
SECOND-ORDER CONVEX SPLITTING SCHEMES FOR GRADIENT FLOWS WITH EHRLICH-SCHWOEBEL TYPE ENERGY: APPLICATION TO THIN FILM EPITAXY
