Add to ORKGThe disentangling process is the key to Feynman\u27s operational calculus for noncommuting operators. The main result of his heuristic calculations deals with disentangling an exponential factor. We use the Wiener and Feynman integrals to make this disentangling (or time-ordering) mathematically rigorous in the case where the analytic functions from earlier work are replaced by Fourier transforms of complex measures
AbstractWe give a fairly general class of functionals on a path space so that Feynman path integral ...
Abstract. This paper explores the differential (or derivational) calculus associated with the disent...
In Feynman\u27s Operational Calculi, a function of indeterminates in a commutative space is mapped t...
The disentangling process is the key to Feynman\u27s operational calculus for noncommuting operators...
The disentangling process is the key to Feynman\u27s operational calculus for noncommuting operators...
It is known that Wiener and Feynman path integrals provide one way of making Feynman\u27s heuristic ...
It is known that Wiener and Feynman path integrals provide one way of making Feynman\u27s heuristic ...
This book is aimed at providing a coherent, essentially self-contained, rigorous and comprehensive a...
In a 1951 paper, R. P. Feynman presented a heuristic method for forming functons of noncommuting ope...
We survey the author’s recent development of Jefferies and Johnson‘s theory of Feynman’s opera-tiona...
AbstractThe authors recently introduced a family {Att⩾0} of Banach algebras of functionals on Wiener...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
AbstractIn this paper, we survey progress on the Feynman operator calculus and path integral. We fir...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
AbstractWe give a fairly general class of functionals on a path space so that Feynman path integral ...
Abstract. This paper explores the differential (or derivational) calculus associated with the disent...
In Feynman\u27s Operational Calculi, a function of indeterminates in a commutative space is mapped t...
The disentangling process is the key to Feynman\u27s operational calculus for noncommuting operators...
The disentangling process is the key to Feynman\u27s operational calculus for noncommuting operators...
It is known that Wiener and Feynman path integrals provide one way of making Feynman\u27s heuristic ...
It is known that Wiener and Feynman path integrals provide one way of making Feynman\u27s heuristic ...
This book is aimed at providing a coherent, essentially self-contained, rigorous and comprehensive a...
In a 1951 paper, R. P. Feynman presented a heuristic method for forming functons of noncommuting ope...
We survey the author’s recent development of Jefferies and Johnson‘s theory of Feynman’s opera-tiona...
AbstractThe authors recently introduced a family {Att⩾0} of Banach algebras of functionals on Wiener...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
AbstractIn this paper, we survey progress on the Feynman operator calculus and path integral. We fir...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
It is a well known result that the Feynman's path integral (FPI) approach to quantum mechanics is eq...
AbstractWe give a fairly general class of functionals on a path space so that Feynman path integral ...
Abstract. This paper explores the differential (or derivational) calculus associated with the disent...
In Feynman\u27s Operational Calculi, a function of indeterminates in a commutative space is mapped t...