On the singular p-Laplacian system under Navier slip type boundary conditions. The gradient-symmetric case
Abstract
We consider the p-Laplacian system of N equations in n space variables, 1< p≤ 2, under the homogeneous Navier slip boundary condition. Furthermore, the gradient of the velocity is replaced by the, more physical, symmetric gradient. We prove W2, q regularity, up to the boundary, under suitable assumptions on the couple p,q. The singular case μ= 0 is covered.
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