Maximal regularity with temporal weights for parabolic problems with inhomogeneous boundary conditions

## Abstract In this paper we investigate a nonlinear 1D parabolic problem with algebraic‐differential boundary conditions. Existence, uniqueness and higher regularity of the solution is proved. It is shown that actually any regularity can be obtained provided that appropriate smoothness of the data

## Let be a bounded domain in N and let m be a T -periodic function such that its restriction to × 0 T belongs to L s 0 T L v for some v > N 2 and s > 2v 2v-N , with v > 1 and s ≥ 2. We give necessary and sufficient conditions on m for the existence, uniqueness, and simplicity of the principal eig

We investigate the continuity of solutions for general nonlinear parabolic equations with non-standard growth near a nonsmooth boundary of a cylindrical domain. We prove a sufficient condition for regularity of a boundary point.

## Abstract We obtain the __L__~__p__~–__L__~__q__~ maximal regularity of the Stokes equations with Robin boundary condition in a bounded domain in ℝ^__n__^ (__n__⩾2). The Robin condition consists of two conditions: __v__ ⋅ __u__=0 and α__u__+β(__T__(__u__, __p__)__v__ – 〈__T__(__u__, __p__)__v__,