Solvability of the Dirichlet problem using a weaker Carleson condition in the upper half plane
Abstract
We study an elliptic operator L:=div(A∇ ·) on the upper half plane R2+. There are several conditions on the behavior of the matrix A in the transversal t-direction that yield ω∈ A∞(σ). These include the t-independence condition, a mixed L1-L∞ condition on ∂t A, and Dini-type conditions. We introduce an L1 Carleson condition on ∂t A(x,t) that extends the class of elliptic operators for which we have ω∈ A∞(σ), i.e. solvability of the Lp Dirichlet problem for some 1<p<∞.
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