Cahn-Hilliard equations with memory and dynamic boundary conditions

We consider a modified Cahn-Hiliard equation where the velocity of the order parameter u depends on the past history of Delta mu, mu being the chemical potential with an additional viscous term alpha u(t), alpha >= 0. This type of equation has been proposed by P. Galenko et al. to model phase separation phenomena in special materials (e.g., glasses). In addition, the usual no-flux boundary condition for u is replaced by a nonlinear dynamic boundary condition which accounts for possible interactions with the boundary. The resulting boundary value problem is subject to suitable initial conditions and is reformulated in the so-called past history space. Existence of a variational solution is obtained. Then, in the case alpha > 0, we can also prove uniqueness and construct a strongly continuous semigroup acting on a suitable phase space. We show that the corresponding dynamical system has a (smooth) global attractor as well as an exponential attractor. In the case alpha = 0, we only establish the existence of a trajectory attractor.