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Separable Schrödinger Equations for Two Interacting Particles in External Fields
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6. denotes the set of distributions over the infinitely differentiable functions with compact support. See L. Schwartz, Thétorie des distributions (Hermann, Paris, 1950).
7.Or, more generally, Since the dimension of the configuration space does not enter into the argument, we believe all results hold for arbitrary n. However, we have not constructed a proof of the lemma in the appendix for arbitrary n.
8.The mathematics can be generalized to the case of more functions V, allowing corresponding higher‐order polynomial solutions.
9.L. Schwartz, Théorie des distributions (Hermann, Paris, 1950).
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