DISTRIBUTIONS IN HILBERT SPACE AND CANONICAL SYSTEMS OF OPERATORS ^ )
@inproceedings{Segal2010DISTRIBUTIONSIH,
title={DISTRIBUTIONS IN HILBERT SPACE AND CANONICAL SYSTEMS OF OPERATORS ^ )},
author={Irving Ezra Segal},
year={2010}
}- Published 2010
Although the algebraic features of the theory of probability distributions on an infinite-dimensional linear space generally resemble those of the familiar theory on finite-dimensional spaces, there are some important differences, in which certain of the mathematical difficulties of quantum field theory originate. In the present paper we treat one such aspect of distributions, their absolute continuity and transformation properties, and initiate the application of the results to uniqueness and… CONTINUE READING
From This Paper
Topics from this paper.
Citations
Publications citing this paper.
Showing 1-10 of 12 extracted citations
SOME CONTINUITY PROPERTIES OF BROWNIAN MOTION WITH THE TIME PARAMETER IN HILBERT SPACE,1)
View 3 Excerpts
Highly Influenced
Deformation quantization on a Hilbert space
View 2 Excerpts
ON THE SOLUTIONS OF A STOCHASTIC CONTROL SYSTEM II
View 1 Excerpt
DIFFUSION SEMIGROUPS ON ABSTRACT WIENER SPACE
View 1 Excerpt
References
Publications referenced by this paper.
Showing 1-7 of 7 references
ON RINGS OF OPERATORS. II*
View 1 Excerpt
Transformation of Wiener integrals under translations, Ann
Representations of the anticommutation relations
View 3 Excerpts
Mathematical aspects of the quantum theory of fields
View 1 Excerpt
Decompositions of operator algebras
View 1 Excerpt
On equivalence of infinite product measures
View 1 Excerpt
Dirac, The principles of quantum mechanics, 3d ed., Oxford, 1947
View 1 Excerpt