Radial symmetric elements and the Bargmann transform
classification
🧮 math.FA
keywords
functionbargmannmathbfradialsymmetrictransformcanonicalcomposition
read the original abstract
We prove that a function or distribution on $\rr d$ is radial symmetric, if and only if its Bargmann transform is a composition by an entire function on $\mathbf C$ and the canonical quadratic function from $\cc d$ to $\mathbf C$.
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