The inverse problem for perturbed harmonic oscillator on the half-line

Abstract

We consider the perturbed harmonic oscillator TD=-''+x2+q(x), (0)=0 in L2(R+), where q∈ H+=\q', xq∈ L2(R+)\ is a real-valued potential. We prove that the mapping q spectral data= \eigenvalues of\TD \ \norming constants\ is one-to-one and onto. The complete characterization of the set of spectral data which corresponds to q∈ H+ is given. Moreover, we solve the similar inverse problem for the family of boundary conditions '(0)=b (0), b∈ R.

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