Asymptotic behavior of a Cahn–Hilliard–Navier–Stokes system in 2D CG Gal, M Grasselli Annales de l'IHP Analyse non linéaire 27 (1), 401-436, 2010 | 253 | 2010 |
Trajectory attractors for binary fluid mixtures in 3D CG Gal, M Grasselli Chinese Annals of Mathematics, Series B 31 (5), 655-678, 2010 | 135 | 2010 |
Oscillatory boundary conditions for acoustic wave equations CG Gal, GR Goldstein, JA Goldstein Nonlinear Evolution Equations and Related Topics: Dedicated to Philippe …, 2004 | 105 | 2004 |
The non-isothermal Allen-Cahn equation with dynamic boundary conditions CG Gal, M Grasselli Discrete Contin. Dyn. Syst 22 (4), 1009-1040, 2008 | 103 | 2008 |
Longtime behavior for a model of homogeneous incompressible two-phase flows CG Gal, M Grasselli Discrete Contin. Dyn. Syst 28 (1), 1-39, 2010 | 96 | 2010 |
The nonlocal Cahn–Hilliard equation with singular potential: well-posedness, regularity and strict separation property CG Gal, A Giorgini, M Grasselli Journal of Differential Equations 263 (9), 5253-5297, 2017 | 90 | 2017 |
A Cahn–Hilliard model in bounded domains with permeable walls CG Gal Mathematical methods in the applied sciences 29 (17), 2009-2036, 2006 | 88 | 2006 |
Longtime behavior of nonlocal Cahn-Hilliard equations CG Gal, M Grasselli arXiv preprint arXiv:1207.4018, 2012 | 77 | 2012 |
Fractional-in-time semilinear parabolic equations and applications CG Gal, M Warma Springer, 2020 | 73 | 2020 |
On nonlocal Cahn–Hilliard–Navier–Stokes systems in two dimensions S Frigeri, CG Gal, M Grasselli Journal of Nonlinear Science 26, 847-893, 2016 | 73 | 2016 |
Nonlinear abstract differential equations with deviated argument CG Gal Journal of mathematical analysis and applications 333 (2), 971-983, 2007 | 71 | 2007 |
Instability of two-phase flows: a lower bound on the dimension of the global attractor of the Cahn–Hilliard–Navier–Stokes system CG Gal, M Grasselli Physica D: Nonlinear Phenomena 240 (7), 629-635, 2011 | 70 | 2011 |
Global solutions for the 2D NS–CH model for a two-phase flow of viscous, incompressible fluids with mixed partial viscosity and mobility C Cao, CG Gal Nonlinearity 25 (11), 3211, 2012 | 65 | 2012 |
On a class of degenerate parabolic equations with dynamic boundary conditions CG Gal Journal of Differential Equations 253 (1), 126-166, 2012 | 64 | 2012 |
Cahn–Hilliard–Navier–Stokes systems with moving contact lines CG Gal, M Grasselli, A Miranville Calculus of Variations and Partial Differential Equations 55 (3), 50, 2016 | 61 | 2016 |
The role of Wentzell boundary conditions in linear and nonlinear analysis GM Coclite, A Favini, CG Gal, GR Goldstein, JA Goldstein, E Obrecht, ... Advances in nonlinear analysis: Theory, methods and applications 3, 279-292, 2009 | 58 | 2009 |
Nonlocal transmission problems with fractional diffusion and boundary conditions on non-smooth interfaces CG Gal, M Warma Communications in Partial Differential Equations 42 (4), 579-625, 2017 | 55 | 2017 |
Asymptotic behavior of a Cahn-Hilliard equation with Wentzell boundary conditions and mass conservation CG Gal, H Wu Discrete and Continuous Dynamical Systems 22 (4), 1041-1063, 2008 | 53 | 2008 |
Reaction-diffusion equations with fractional diffusion on non-smooth domains with various boundary conditions CG Gal, M Warma Discrete Contin. Dyn. Syst 36 (3), 1279-1319, 2016 | 52 | 2016 |
Well posedness and the global attractor of some quasi-linear parabolic equations with nonlinear dynamic boundary conditions CG Gal, M Warma | 52 | 2010 |