Abstract
We propose a theorem for the quantum operator that corresponds to the solution of the Helmholtz equation, i.e.,∫∫∫V(x1,x2,x3)|x1,x2,x3⟩⟨x1,x2,x3|d3x = V(X1,X2,X3) = e−λ2/4:V(X1,X2,X3):,where V(x1,x2,x3) is the solution to the Helmholtz equation ▿2V + λ2V = 0, the symbol: : denotes normal ordering, and X1,X2,X3 are three-dimensional coordinate operators. This helps to derive the normally ordered expansion of Dirac's radius operator functions. We also discuss the normally ordered expansion of Bessel operator functions.
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