Publications

  1. H. Bessaih, M. J. Garrido-Atienza, B. Schmalfuss (2013), Pathwise solutions and attractors for retarded SPDEs with time smooth diffusion coefficients, arxive: 1302. 2400
  2. H. Bessaih, B. Ferrario (2012), Inviscid limit of stochastic damped 2D Navier-Stokes equations, arxive: 1212.0509.
  3. D. Barbato, H. Bessaih, B. Ferrario (2012), On a Stochastic Leray-α model of Euler equations, arxive: 1210.2165
  4. H. Bessaih, B. Ferrario (2012), Statistical properties of stochastic 2D Navier-Stokes equation, arxive: 1206.4140
  5. H. Bessaih, B. Ferrario (2012), 2D hydrodynamical systems: invariant measures of Gaussian type, Jour. Stat. Phys., Vol 149., no 2., pp259-283.
  6. H. Bessaih, B. Ferrario (2012), Invariant Gibbs measures of the energy for shell models of turbulence; the inviscid and viscous cases., Nonlinearity, 25, pp1075-1097.
  7. H. Bessaih, A. Millet, (2012), Large deviation principle and the zero viscosity limit for the 2D Navier-Stokes equations with a free boundary condition,SIAM. J. Math. Anal., Vol 44., No 3, pp1861-1893
  8. H. Bessaih, C. Wijeratne (2011), An integrodifferential equation driven by fractional Brownian motion., arXiv:1103.3489v1. [Math. PR]
  9. H. Bessaih, R. Kapica, T, Szarek (2010), The stability of some stochastic processes, arXiv:1012.3202v1 [math.ph]
  10. H. Bessaih, F. Flandoli, E.S.Titi, (2010), Stochastic attractors for stochastic shell phenomenological models of turbulence, Journal of Statistical Physics., Vol 140 (4), 688-717.
  11. H. Bessaih, A. Millet, (2009), Large deviation principle and inviscid shell models, Electronic Journal of Probability, Vol 14 No 89, 2551-2579.
  12. H. Bessaih, (2008), Stationary solutions for a dissipative Euler equation, Progress in Probability, 59, Birkhäuser, Basel, 23-36.
  13. H Bessaih, H. Schurz, (2007), Upper Bounds on the Rate of Convergence of Truncated Stochastic Infinite-Dimensional Differential Systems with H-Regular Noise, Journal of Comp. Appli. Math, 208, 354-361.
  14. D. Barbato, M. Barsanti, H. Bessaih, F. Flandoli, (2006), Some rigorous results on a stochastic Goy model, Journal of Statistical Physics, Vol. 125, No 3, 677-716.
  15. H. Bessaih, M. Gubinelli, F. Russo, (2005), The evolution of a random vortex filament, Annals of Probability, 33, no. 5, 1825-1855.
  16. H. Bessaih, F. Flandoli, (2004), Limit behaviour of a dense collection of vortex filaments, Math. Models Methods Appl. Sci., 14, no.2, 189-215.
  17. H. Bessaih, F. Flandoli, (2003), A mean field result for 3D vortex filaments, Probabilistic methods in fluids, World Sci. Publishing, River Edge, NJ, 22--34
  18. H. Bessaih, (2003), Semi-linearized compressible Navier-Stokes equations perturbed by noise, Eletron. J. Differential Equations, no. 2, 1-18.
  19. Luigi. C. Berselli, H. Bessaih, (2002), Some results for the line vortex equation, Nonlinearity, 15, no., 6, 1729-1746.
  20. H. Bessaih, F. Flandoli, (2000), Weak attractor for a dissipative Euler equation, J. Dynam. Differential Equations., 12, no. 4, 713-732.
  21. H. Bessaih, (2000), Stochastic weak attractor for a dissipative Euler equation, Electron. J. Probab., 5, no. 3, 1-16.
  22. H. Bessaih, (1999), Martingale solutions for stochastic Euler equations, Stochastic Anal. Appl., 17, no. 5, 713-725.
  23. H. Bessaih, F. Flandoli, (1999), 2-D Euler equation perturbed by noise, NoDEA Nonlinear Differential Equations Appl., 6, no. 1, 35-54.
  24. H. Bessaih, (1996), On the stability of the solutions to the compressible Navier-Stokes equation when the Mach number goes to zero, NoDEA Nonlinear Differential Equations Appl., 3, no. 4, 509-520.
  25. H. Bessaih, (1995), Limite de modeles de fluides compressibles, Portugal. Math., 52, no. 4, 441-463.
  26. H. Bessaih, (1994), Incompressible limit of compressible Navier-Stokes equations, Qualitative aspects and applications of nonlinear evolution equations, World ScPublishing, River Edge, NJ, 125-129.

Others

  1. H. Bessaih, (1995), Regularity and Asymptotic behavior of the solutions of the Navier-Stokes equations with diffusion, S.N.S., n.31.