An inverse problem for fractional connection Laplacians
Abstract
Consider a fractional operator Ps, 0<s<1, for connection Laplacian P:=∇*∇+A on a smooth Hermitian vector bundle over a closed, connected Riemannian manifold of dimension n≥ 2. We show that local knowledge of the metric, Hermitian bundle, connection, potential, and source-to-solution map associated with Ps determines these structures globally. This extends a result known for the fractional Laplace-Beltrami operator.
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