Functional inversion for potentials in quantum mechanics

Abstract

Let E = F(v) be the ground-state eigenvalue of the Schroedinger Hamiltonian H = -Delta + vf(x), where the potential shape f(x) is symmetric and monotone increasing for x > 0, and the coupling parameter v is positive. If the 'kinetic potential' barf(s) associated with f(x) is defined by the transformation: barf(s) = F'(v), s = F(v)-vF'(v),then f can be reconstructed from F by the sequence: f[n+1] = barf o barf[n]-1 o f[n]. Convergence is proved for special classes of potential shape; for other test cases it is demonstrated numerically. The seed potential shape f[0] need not be 'close' to the limit f.

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