The regularity problem with a weaker condition on only the transversal direction
Abstract
We study an elliptic operator L:=div(A∇ ·) on the upper half space. It is known that if the matrix A is independent in the transversal t-direction, then the regularity boundary value problem is solvable with data in a Sobolev space. In the present paper we improve on the t-independence condition by introducing a mixed L1-L∞ condition that only depends on ∂t A, the derivative of A in transversal direction. This condition is different from other conditions in the literature and has already been proven to imply solvability of the Dirichlet boundary value problem.
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