The Dirichlet problem on lower dimensional boundaries: Schauder estimates via perforated domains
Abstract
In this paper, we investigate the Dirichlet problem on lower dimensional manifolds for a class of weighted elliptic equations with coefficients that are singular on such sets. Specifically, we study the problem \[cases - div(|y|a A(x,y) ∇ u) = |y|a f + div(|y|a F), \\ u = , on 0, cases \] where (x,y) ∈ Rd-n × Rn, 2 ≤ n ≤ d, a + n ∈ (0,2), and 0 = \|y| = 0\ is the lower dimensional manifold where the equation loses uniform ellipticity. Our primary objective is to establish C0,α and C1,α regularity estimates up to 0, under suitable assumptions on the coefficients and the data. Our approach combines perforated domain approximations, Liouville-type theorems and a fine blow-up argument.
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