References
- Foias C, Manley O, Temam R. Attractors for the Bénard problem: existence and physical bounds on their fractal dimension. Nonlinear Anal. Theory Methods Appl. 1987;11:939–967.
- Cabral M, Rosa R, Temam R. Existence and dimension of the attractor for Bénard problem on channel-like domains. Discrete Contin. Dyn. Syst. 2004;10:89–116.
- Ly HV, Titi ES. Global Gevrey regularity for the Bénard Convection in a porous medium with zero Darcy–Prandtl number. J. Nonlinear Sci. 1999;9:333–362.
- Kapusyan OV, Melnik VS, Valero J. A weak attractor and properties of solutions for the three-dimensional Bénard problem. Discrete Contin. Dyn. Syst. 2007;18:449–481.
- Birnir B, Svanstedt N. Existence theory and strong attractors for the Rayleigh–Bénard problem with a large aspect ratio. Discrete Contin. Dyn. Syst. 2004;10:53–74.
- Aldama AA.Filtering techniques for turbulent flow simulation. Vol. 56. Lecture notes in engineering. Berlin: Springer-Verlag; 1990.
- Leonard A. Energy cascade in large eddy simulation of turbulent flow. Adv. Geophys. 1974;18 A:237–248.
- Yeo WK. A generalized high pass/low pass averaging procedure for deriving and solving turbulent flow equations.Colombus (OH): Ohio State University/University Microfilms international; 1987.
- Bardina J, Ferziger J, Reynolds W. Improved subgrid scale models for large eddy simulation. Snowmass (CO): American Institute of Aeronatics and Plasma dynamics Conference 13th; 1980.
- Layton W, Lewandowski R. On a well-posed turbulence model. Discrete Contin. Dyn. Syst. B. 2006;6:111–128.
- Chen S, Foias C, Holm DD, Olson E, Titi ES, Wynne S. A connection between the Camassa-Holm equation and turbulent flows in channels and pipes. Phys. Fluids. 1999;11:2343–2353.
- Chen S, Foias C, Holm DD, Olson E, Titi ES, Wynne S. Camassa–Holm equations as a closure model for turbulent channel and pipe flow. Phys. Rev. Lett. 1998;81:5338–5341.
- Ilyin A, Lunasin E, Titi ES. A modified-Leray α subgrid scale model of turbulence. Nonlinearity. 2006;19:879–897.
- Chen S, Foias C, Holm DD, Olson E, Titi ES, Wynne S. The Camassa–Holm equations and turbulence. Pysica D. 1999;133:49–65.
- Temam R. Infinite dimensional dynamical system in mechanic and physics. Berlin: Springer Verlag; 1997.
- Adams RA. Sobolev Spaces. New York (NY): Academic Press; 1975.
- Agmon S. Lectures on elliptic boundary value problems. New York (NY): Van Nostrand; 1965.
- Constantin P, Foias C. Navier–Stokes equations. Chicago Lectures in Mathematics. Chicago (IL): The University of Chicago; 1988.
- Temam R. Navier–Stokes equations: theory and numerical analysis. North-Holland-Amsterdam: AMS Chelsa Publishing; 1984.
- Cao Y, Lunasin EM, Titi E. Global well-posedness of the three-dimensional viscous and inviscid simplified Bardina turbulence models. Comm. Math. Sci. 2006;4:823–848.
- Foias C, Holm DD, Titi ES. The three dimensional viscous Camassa–Holm equations, and their relation to the Navier–Stokes equations and turbulence theory. J. Dyn. Differ. Equ. 2002;14:1–35.
- Hale JK. Asymptotic behaviour of dissipative Systems, Mathematical Survey and Monographs, Vol. 25, American Mathematical Society, Providence, RI;1988.
- Sell G, You Y. Dynamics of evolutionary equations. New York (NY): Springer-Verlag; 2002.
- Ladyhenskaya OA. On the determination of minimal global attractors for the Navier Stokes and other partial differential equations. Uspekhi Math. Nauk. 1987;42:25–60. Russian Math. Survey. 1987;42:27–73.
- Ladyhenskaya OA. Finite dimensionality of bounded invariant sets for Navier-Stokes systems and other dissipative systems. Zap. Nauchn. Sem. LOMI. 1982;115:137–155. J. Soviet Math. 1985;28:714–726.