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Cheskidov, Alexey - Department of Mathematics, Statistics, and Computer Science, University of Illinois at Chicago
arXiv:0704.2089v1[math.AP]17Apr2007 ON THE ENERGY EQUALITY FOR WEAK
Boundary layer for the NavierStokesalpha model of fluid turbulence #
arXiv:0708.3067v2[math.AP]6Sep2007 ON THE REGULARITY OF WEAK SOLUTIONS OF THE 3D
arXiv:physics/0607280v130Jul2006 APS/123-QED Energy Dissipation in Fractal-Forced Flow
Turbulent boundary layer equations Equations de la couche limite turbulente
THEORETICAL SKINFRICTION LAW IN A TURBULENT BOUNDARY LAYER A. CHESKIDOV
arXiv:physics/0611001v2[physics.flu-dyn]3Jul2007 Leray-model and transition to turbulence in rough-wall boundary layers
ON A LERAY- MODEL OF TURBULENCE A. CHESKIDOV, D. D. HOLM, E. OLSON, AND E. S. TITI
Research Statement Alexey Cheskidov More than 70 years ago, J. Leray introduced a notion of weak solutions [49], which became a basic con-
arXiv:0904.2196v1[math.AP]14Apr2009 ILL-POSEDNESS OF BASIC EQUATIONS OF FLUID
arXiv:math.AP/0610815v126Oct2006 AN INVISCID DYADIC MODEL OF TURBULENCE: THE
arXiv:math.AP/0601074v28Jun2006 BLOW-UP IN FINITE TIME FOR THE DYADIC MODEL OF THE
On global attractors of the 3D Navier-Stokes equations A. Cheskidov
THEORETICAL SKIN-FRICTION LAW IN A TURBULENT BOUNDARY LAYER A. CHESKIDOV
Boundary layer for the Navier-Stokes-alpha model of fluid turbulence
On the Non-Homogeneous Stationary Kuramoto-Sivashinsky Equation
arXiv:math.AP/0610814v231Dec2006 AN INVISCID DYADIC MODEL OF TURBULENCE: THE
On the NonHomogeneous Stationary KuramotoSivashinsky Equation
