Friedrichs' extension lemma with boundary values and applications in complex analysis

Abstract

Let Q be a first-order differential operator on a compact, smooth oriented Riemannian manifold with smooth boundary. Then, Friedrichs' extension lemma states that the minimal closed extension Qmin (the closure of the graph) and the maximal closed extension Qmax (in the sense of distributions) of Q in Lp-spaces (1≤ p<∞) coincide. In the present paper, we show that the same is true for boundary values with respect to Qmin and Qmax. This gives a useful characterization of weak boundary values, particularly for Q=d-bar the Cauchy-Riemann operator. As an application, we derive the Bochner-Martinelli-Koppelman formula for Lp-forms with weak d-bar-boundary values.