Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields

Abstract

In this paper, we characterize all the distributions F ∈ D'(U) such that there exists a continuous weak solution v ∈ C(U,Cn) (with U ⊂ ) to the divergence-type equation L1*v1+...+Ln*vn=F, where \L1,…,Ln\ is an elliptic system of linearly independent vector fields with smooth complex coefficients defined on ⊂ RN. In case where (L1,…, Ln) is the usual gradient field on RN, we recover the classical result for the divergence equation proved by T. De Pauw and W. Pfeffer.