In this paper, we investigate the unique continuation property for the inequality $|\bar\partial u| \le V|u|$, where u is a vector-valued function from a domain in Cⁿ to C^N, and the potential V ∈ L². We show that the strong unique continuation property holds when n=1, and the weak unique continuation property holds when n>1. In both cases, the L² integrability condition on the potential is optimal.

N/A