Identification of a connection from Cauchy data on a Riemann surface with boundary

Abstract

We consider a connection ∇X on a complex line bundle over a Riemann surface with boundary M0, with connection 1-form X. We show that the Cauchy data space of the connection Laplacian (also called magnetic Laplacian) L:=∇X*∇X + q, with q a complex valued potential, uniquely determines the connection up to gauge isomorphism, and the potential q.