On the Solvability of a Class of Degenerate or Singular Strongly Coupled Parabolic Systems

Abstract

The existence of strong solutions to general class of strongly coupled parabolic systems will be discussed. These systems can be degenerate or singular as boundedness of theirs solutions are unavailable and not assummed. The results greatly improve those in a recent papers letrans,dleJFA,dleANS as the systems can have quadratic growth in gradients. A unified proof for both cases is presented. Most importantly, the VMO assumption in dleJFA,dleANS will be replaced by a much versatile one thanks to a new local weighted Gagliardo-Nirenberg involving BMO norms. Degenerate and singular generalized SKT models in biology will be presented as a nontrivial application of the main theorem.