Remarks on elliptic equations degenerating on lower dimensional manifolds

Abstract

The paper continues the analysis started in [Cora-Fioravanti-Vita-25,Fioravanti-24] on the local regularity theory for elliptic equations having coefficients which are degenerate or singular on some lower dimensional manifold. The model operator is given by Lau(z)=div(|y|a∇ u)(z), where z=(x,y)∈ Rd-n× Rn, 2≤ n≤ d are two integers and a∈ R. The weight term is degenerate/singular on the (possibly very) thin characteristic manifold 0=\|y|=0\ of dimension 0≤ d-n≤ d-2. Whenever a+n>0, we prove smoothness of the axially symmetric La-harmonic functions. In the mid-range a+n∈(0,2), we deal with regularity estimates for solutions with inhomogeneous conormal boundary conditions prescribed at 0, and we establish the connection with fractional Laplacians on very thin flat manifolds via Dirichlet-to-Neumann maps, as a higher codimensional analogue of the extension theory developed by Caffarelli and Silvestre. Finally, whenever a+n<2 we complement the study in [Fioravanti-24], providing some regularity estimates for solutions having a homogeneous Dirichlet boundary condition prescribed at 0 by a boundary Harnack type principle.