Physics – Mathematical Physics
Scientific paper
2001-01-30
Physics
Mathematical Physics
35 pages TEX 1 embedded jpg figure
Scientific paper
A system of differential forms will establish a topology and a topological structure on a domain of independent variables such that is possible to determine which maps or processes acting on the system are continuous. Perhaps the most simple topology is that generated by the existence of a single 1-form of Action, its Pfaff sequence of exterior differentials, and their intersections. In such a topology the exterior derivative becomes a limit point generator in the sense of Kuratowski. The utilization of such techniques in physical systems is examined. A key feature of the Cartan topology is determined by the Pfaff dimension (representing the minimum number of functions to describe the 1-form generator). In particular, when the Pfaff dimension is 3 or more the Cartan topology becomes a disconnected topology, with the existence of topological torsion and topological parity. Most classical physical applications are constrained to cases where the Pfaff dimension is 2 or less, for such is the domain of unique integrability. The more interesting domain of non-unique solutions requires the existence of topological torsion, and can lead to an understanding of irreversible processes without the use of statistics.
Baldwin Phil
Kiehn R. M.
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