Unique continuation of Schr\"odinger-type equations for ∂
Abstract
The purpose of this paper is to study the unique continuation property for a Schr\"odinger-type equation ∂ u = Vu on a domain in Cn, where the solution u may be a scalar function, or a vector-valued function. While simple examples show that the unique continuation property fails in general if the potential V∈ Lp, p<2n, we first prove that, in the case when u is a scalar function, the unique continuation property holds when V∈ Lloc2n and is ∂-closed. For vector-valued smooth solutions, we establish the unique continuation property either when V∈ Llocp , p>2n for n 3, or when V∈ Lloc2n for n = 2. Finally, we discuss the unique continuation property for some special cases where V Lloc2n, for instance, V is a constant multiple of 1|z|.
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