Inverse spectral results for Schr\"odinger operators on the unit interval with potentials in LP spaces
Abstract
We consider the Schr\"odinger operator on [0,1] with potential in L1. We prove that two potentials already known on [a,1] (a∈(0,1/2]) and having their difference in Lp are equal if the number of their common eigenvalues is sufficiently large. The result here is to write down explicitly this number in terms of p (and a) showing the role of p.
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