Sub-elliptic boundary value problems in flag domains

Abstract

A flag domain in R3 is a subset of R3 of the form \(x,y,t) : y < A(x)\, where A R R is a Lipschitz function. We solve the Dirichlet and Neumann problems for the sub-elliptic Kohn-Laplacian = X2 + Y2 in flag domains ⊂ R3, with L2-boundary values. We also obtain improved regularity for solutions to the Dirichlet problem if the boundary values have first order L2-Sobolev regularity. Our solutions are obtained as sub-elliptic single and double layer potentials, which are best viewed as integral operators on the first Heisenberg group. We develop the theory of these operators on flag domains, and their boundaries.