Bounded Weak Solutions to a Class of Degenerate Cross-Diffusion Systems

Abstract

Bounded weak solutions are constructed for a degenerate parabolic system with a full diffusion matrix, which is a generalized version of the thin film Muskat system. Boundedness is achieved with the help of a sequence (En)n 2 of Liapunov functionals such that En is equivalent to the Ln-norm for each n 2 and En1/n controls the L∞-norm in the limit n∞. Weak solutions are built by a compactness approach, special care being needed in the construction of the approximation in order to preserve the availability of the above-mentioned Liapunov functionals.