A self-adjoint decomposition of radial momentum implies that Dirac's introduction of the operator is insightful
Abstract
With acceptance of the Dirac's observation that the canonical quantization entails using Cartesian coordinates, we examine the\ % operator erPr rather than Pr itself and demonstrate that there is a decomposition of erPr into two self-adjoint but non-commutative parts, in which one is the total momentum and another is the transverse one. This study renders the operator Pr indirectly measurable and physically meaningful.
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