Feynman integrals for non-smooth and rapidly growing potentials
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🧮 math-ph
math.MP
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feynmangrowingmeasurespotentialsrapidlyadmitconstructedexpansion
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The Feynman integral for the Schroedinger propagator is constructed as a generalized function of white noise, for a linear space of potentials spanned by measures and Laplace transforms of measures, i.e., locally singular as well as rapidly growing at infinity. Remarkably, all these propagators admit a perturbation expansion.
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