EXISTENCE OF GLOBAL WEAK SOLUTIONS TO A CAHN-HILLIARD CROSS-DIFFUSION SYSTEM IN LYMPHANGIOGENESIS

The global-in-time existence of weak solutions to a degenerate Cahn-Hilliard cross-diffusion system with singular potential in a bounded domain with no-flux boundary conditions is proved. The model consists of two coupled parabolic fourth-order partial differential equations and describes the evolution of the fiber phase volume fraction and the solute concentration, modeling the pre-patterning of lymphatic vessel morphology. The fiber phase fraction satisfies the segregation property if this holds initially. The existence proof is based on a three-level approximation scheme and a priori estimates coming from the energy and entropy inequalities. While the free energy is non-increasing in time, the entropy is only bounded because of the cross-diffusion coupling.