Uniqueness Results for Matrix-Valued Schr\"odinger, Jacobi, and Dirac-Type Operators
Abstract
Let g(z,x) denote the diagonal Green's matrix of a self-adjoint m× m matrix-valued Schr\"odinger operator H= -d2dx2Im +Q(x) in L2 ()m, m∈. One of the principal results proven in this paper states that for a fixed x0∈ and all z∈+, g(z,x0) and g (z,x0) uniquely determine the matrix-valued m× m potential Q(x) for a.e.~x∈. We also prove the following local version of this result. Let gj(z,x), j=1,2 be the diagonal Green's matrices of the self-adjoint Schr\"odinger operators Hj=-d2dx2Im +Qj(x) in L2 ()m. Suppose that for fixed a>0 and x0∈, \|g1(z,x0)-g2(z,x0)\|m× m+ \|g1 (z,x0)-g2 (z,x0)\|m× m |z|∞=O(e-2(z1/2)a) for z inside a cone along the imaginary axis with vertex zero and opening angle less than π/2, excluding the real axis. Then Q1(x)=Q2(x) for a.e.~x∈ [x0-a,x0+a]. Analogous results are proved for matrix-valued Jacobi and Dirac-type operators.
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