Layer potentials and boundary value problems for elliptic equations with complex L∞ coefficients satisfying the small Carleson measure norm condition

Abstract

We consider divergence form elliptic equations Lu:=∇·(A∇ u)=0 in the half space Rn+1+ :=\(x,t)∈ Rn×(0,∞)\, whose coefficient matrix A is complex elliptic, bounded and measurable. In addition, we suppose that A satisfies some additional regularity in the direction transverse to the boundary, namely that the discrepancy A(x,t) -A(x,0) satisfies a Carleson measure condition of Fefferman-Kenig-Pipher type, with small Carleson norm. Under these conditions, we establish a full range of boundedness results for double and single layer potentials in Lp, Hardy, Sobolev, BMO and H\"older spaces. Furthermore, we prove solvability of the Dirichlet problem for L, with data in Lp(Rn), BMO(Rn), and Cα(Rn), and solvability of the Neumann and Regularity problems, with data in the spaces Lp(Rn)/Hp(Rn) and Lp1(Rn)/H1,p(Rn) respectively, with the appropriate restrictions on indices, assuming invertibility of layer potentials in for the t-independent operator L0:= -∇·(A(·,0)∇).