English

A new perspective on Functional Integration

funct-an 2016-08-31 v1 Mathematical Physics Functional Analysis math.MP

Abstract

The core of this article is a general theorem with a large number of specializations. Given a manifold NN and a finite number of one-parameter groups of point transformations on NN with generators Y,X(1),,X(d)Y, X_{(1)}, \cdots, X_{(d)} , we obtain, via functional integration over spaces of pointed paths on NN (paths with one fixed point), a one-parameter group of functional operators acting on tensor or spinor fields on NN. The generator of this group is a quadratic form in the Lie derivatives \LaX(\a)\La_{X_{(\a)}} in the X(\a)X_{(\a)}-direction plus a term linear in \LaY\La_Y. The basic functional integral is over L2,1L^{2,1} paths x:T\raNx: {\bf T} \ra N (continuous paths with square integrable first derivative). Although the integrator is invariant under time translation, the integral is powerful enough to be used for systems which are not time translation invariant. We give seven non trivial applications of the basic formula, and we compute its semiclassical expansion. The methods of proof are rigorous and combine Albeverio H\oegh-Krohn oscillatory integrals with Elworthy's parametrization of paths in a curved space. Unlike other approaches we solve Schr\"odinger type equations directly, rather than solving first diffusion equations and then using analytic continuation.

Keywords

Cite

@article{arxiv.funct-an/9602005,
  title  = {A new perspective on Functional Integration},
  author = {Pierre Cartier and Cécile DeWitt-Morette},
  journal= {arXiv preprint arXiv:funct-an/9602005},
  year   = {2016}
}

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102 pages