Content area
Abstract
In Feynman's Operational Calculi, a function of indeterminates in a commutative space is mapped to an operator expression in a space of (generally) noncommuting operators; the image of the map is determined by a choice of measures associated with the operators, by which the operators are 'disentangled'. Results in this area of research include formulas for disentangling in particular cases of operators and measures. We consider two ways in which this process might be facilitated. First, we develop a set of notations and operations for handling the combinatorial arguments that tend to arise. Second, we develop an intermediate space for the disentangling map, where commutativity might be exploited more extensively.
Details
Title
Combinatorial and commutative manipulations in Feynman's Operational Calculi for noncommuting operators
Author
Einfeld, Duane
Year
2009
ISBN
978-1-109-08439-9
Source type
Dissertation or Thesis
Language of publication
English
ProQuest document ID
304944136
Copyright
Database copyright ProQuest LLC; ProQuest does not claim copyright in the individual underlying works.
