6533b85dfe1ef96bd12bf044
RESEARCH PRODUCT
Cohomology, central extensions, and (dynamical) groups
J. A. De AzcárragaV. Aldayasubject
Pure mathematicsPhysics and Astronomy (miscellaneous)General MathematicsQuantum dynamicsGroup contractionCohomologyGalileansymbols.namesakeMathematics::Quantum AlgebraPoincaré groupPoincaré conjectureCalculussymbolsContraction (operator theory)Mathematicsdescription
We analyze in this paper the process of group contraction which allows the transition from the Einstenian quantum dynamics to the Galilean one in terms of the cohomology of the Poincare and Galilei groups. It is shown that the cohomological constructions on both groups do not commute with the contraction process. As a result, the extension coboundaries of the Poincare group which lead to extension cocycles of the Galilei group in the “nonrelativistic” limit are characterized geometrically. Finally, the above results are applied to a quantization procedure based on a group manifold.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1985-02-01 | International Journal of Theoretical Physics |