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Edriss S. Titi
Edriss S. Titi
University of Cambridge and Texas A&M University
Verified email at math.tamu.edu - Homepage
Title
Cited by
Cited by
Year
Onsager's conjecture on the energy conservation for solutions of Euler's equation
P Constantin, W E, ES Titi
6311994
The Navier–Stokes-alpha model of fluid turbulence
C Foias, DD Holm, ES Titi
Physica D: Nonlinear Phenomena 152, 505-519, 2001
5052001
The three dimensional viscous Camassa–Holm equations, and their relation to the Navier–Stokes equations and turbulence theory
C Foias, DD Holm, ES Titi
Journal of Dynamics and Differential Equations 14, 1-35, 2002
4742002
Global well-posedness of the three-dimensional viscous primitive equations of large scale ocean and atmosphere dynamics
C Cao, ES Titi
Annals of Mathematics, 245-267, 2007
4722007
Camassa-Holm equations as a closure model for turbulent channel and pipe flow
S Chen, C Foias, DD Holm, E Olson, ES Titi, S Wynne
Physical Review Letters 81 (24), 5338, 1998
4141998
On a Leray–α model of turbulence
A Cheskidov, DD Holm, E Olson, ES Titi
Proceedings of the Royal Society A: Mathematical, Physical and Engineering …, 2005
3772005
Approximate inertial manifolds for the Kuramoto-Sivashinsky equation: analysis and computations
MS Jolly, IG Kevrekidis, ES Titi
Physica D: Nonlinear Phenomena 44 (1-2), 38-60, 1990
3391990
Exponential tracking and approximation of inertial manifolds for dissipative nonlinear equations
C Foias, GR Sell, ES Titi
Journal of Dynamics and Differential Equations 1, 199-244, 1989
3311989
On the computation of inertial manifolds
C Foias, MS Jolly, IG Kevrekidis, GR Sell, ES Titi
Physics Letters A 131 (7-8), 433-436, 1988
3111988
A connection between the Camassa–Holm equations and turbulent flows in channels and pipes
S Chen, C Foias, DD Holm, E Olson, ES Titi, S Wynne
Physics of Fluids 11 (8), 2343-2353, 1999
3031999
The Camassa–Holm equations and turbulence
S Chen, C Foias, DD Holm, E Olson, ES Titi, S Wynne
Physica D: Nonlinear Phenomena 133 (1-4), 49-65, 1999
2651999
On approximate inertial manifolds to the Navier-Stokes equations
ES Titi
Journal of mathematical analysis and applications 149 (2), 540-557, 1990
2621990
Upper bounds on the number of determining modes, nodes, and volume elements for the Navier-Stokes equations
DA Jones, ES Titi
Indiana University Mathematics Journal, 875-887, 1993
2431993
Global well-posedness of the three-dimensional viscous and inviscid simplified Bardina turbulence models
Y Cao, EM Lunasin, ES Titi
Communications in Mathematical Sciences 4 (4), 823-848, 2006
2422006
Continuous data assimilation using general interpolant observables
A Azouani, E Olson, ES Titi
Journal of Nonlinear Science 24, 277-304, 2014
2352014
Regularity criteria for the three-dimensional Navier–Stokes equations
C Cao, ES Titi
Indiana University Mathematics Journal, 2643-2661, 2008
2272008
Determining nodes, finite difference schemes and inertial manifolds
C Foias, ES Titi
Nonlinearity 4 (1), 135, 1991
2181991
Gevrey regularity for nonlinear analytic parabolic equations
AB Ferrari, ES Titi
Communications in Partial Differential Equations 23 (1-2), 424-448, 1998
2161998
Global Regularity Criterion for the 3D Navier–Stokes Equations Involving One Entry of the Velocity Gradient Tensor
C Cao, ES Titi
Archive for rational mechanics and analysis 202, 919-932, 2011
2022011
Preserving symmetries in the proper orthogonal decomposition
N Aubry, WY Lian, ES Titi
SIAM Journal on Scientific Computing 14 (2), 483-505, 1993
1881993
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