Are wave functions uniquely determined by their position and momentum distributions?

J. V. Corbett; C. A. Hurst

doi:10.1017/S0334270000001569

Abstract

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The problem of determining a square integrable function from both its modulus and the modulus of its Fourier transform is studied. It is shown that for a large class of real functions the function is uniquely determined from this data. We also construct fundamental subsets of functions that are not uniquely determined. In quantum mechanical language, bound states are uniquely determined by their position and momentum distributions but, in general, scattering states are not.

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Are wave functions uniquely determined by their position and momentum distributions?

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