Nearness and solvability of non-invariant equations on stratified groups

Abstract

We prove the well-posedness of the differential equation Au=f in the setting of a stratified group G when the considered second-order differential operator A can be non-invariant and non-linear. Our approach follows the Campanato theory of nearness of operators, allowing one to treat equations with only bounded coefficients, without any regularity assumptions. Our analysis becomes explicit in the particular case of the Heisenberg group Hn of any dimension and on the Euclidean case Rn, where in the latter case our results also extend the known results by treating the unbounded domain setting.