Feynman's Path Integrals as Evolutionary Semigroups
Abstract
We show that, for a class of systems described by a Lagrangian L(x,x,t) = 1/2x2 - V(x,t) the propagator can be reduced via Noether's Theorem to a standard path integral multiplied by a phase factor. Using Henstock's integration technique, this path integral is given a firm mathematical basis. Finally, we recast the propagator as an evolutionary semigroup.
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