Abstract
We investigate the incomplete inverse spectral problems for Dirac-Bessel operators defined on 0,1. We show that when the potential is known on the subinterval a,1⊆0,1, the potential on the whole interval can be uniquely determined in terms of appropriate partial information on the spectral data including eigenvalues and norming constants. Moreover, these results can be applied to solve the incomplete inverse spectral problems for a class of Bessel operators.
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