A variant of H\"ormander's L2 theorem for Dirac operator in Clifford analysis

Abstract

In this paper, we give the H\"ormander's L2 theorem for Dirac operator over an open subset ∈n+1 with Clifford algebra. Some sufficient condition on the existence of the weak solutions for Dirac operator has been found in the sense of Clifford analysis. In particular, if is bounded, then we prove that for any f in L2 space with value in Clifford algebra, there exists a weak solution of Dirac operator such that Du=f with u in the L2 space as well. The method is based on H\"ormander's L2 existence theorem in complex analysis and the L2 weighted space is utilised.