Regularity of solutions to a model oblique derivative problem for quasilinear parabolic systems with nondiagonal principal matrices

Abstract

We consider quasilinear parabolic systems of equations with nondiagonal principal matrices. The oblique derivative of a solution is defined on the flat part of the lateral surface of a parabolic cylinder. We do not assume smoothness of the principal matrix and the boundary functions in the time variable and prove partial Ho¨lder continuity of a weak solution near the flat part of the lateral surface of the cylinder. Ho¨lder continuity of weak solutions to the correspondent linear problem is stated. A modification of the A(t)-caloric approximation method is applied to study regularity of weak solutions.