Exponential Attractors for a Doubly Nonlinear Equation

## Abstract We consider the following doubly nonlinear parabolic equation in a bounded domain Ω⊂ℝ^3^: where the nonlinearity __f__ is allowed to have a degeneracy with respect to ∂~__t__~__u__ of the form ∂~__t__~__u__|∂~__t__~__u__|^__p__^ at some points __x__∈Ω. Under some natural assumptions o

## Communicated by W. Sprößig We study in this article the long-time behavior of solutions of fourth-order parabolic equations in R 3 . In particular, we prove that under appropriate assumptions on the nonlinear interaction function and on the external forces, these equations possess infinite-dime

We consider in this article the Cahn-Hilliard equation endowed with dynamic boundary conditions. By interpreting these boundary conditions as a parabolic equation on the boundary and by considering a regularized problem, we obtain, by the Leray-Schauder principle, the existence and uniqueness of sol

## Abstract Our aim in this article is to study the long time behaviour of a family of singularly perturbed Cahn‐Hilliard equations with singular (and, in particular, logarithmic) potentials. In particular, we are able to construct a continuous family of exponential attractors (as the perturbation