Hessian estimates for non-divergence form elliptic equations arising from composite materials

Abstract

In this paper, we prove that any W2,1 strong solution to second-order non-divergence form elliptic equations is locally W2,∞ and piecewise C2 when the leading coefficients and data are of piecewise Dini mean oscillation and the lower-order terms are bounded. Somewhat surprisingly here the interfacial boundaries are only required to be C1,Dini. We also derive global weak-type (1,1) estimates with respect to A1 Muckenhoupt weights. The corresponding results for the adjoint operator are established. Our estimates are independent of the distance between these surfaces of discontinuity of the coefficients.