Uncertainty relation in quantum mechanics with quantum group symmetry
- 1 September 1994
- journal article
- research article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 35 (9), 4483-4496
- https://doi.org/10.1063/1.530798
Abstract
The commutation relations, uncertainty relations, and spectra of position and momentum operators were studied within the framework of quantum group symmetric Heisenberg algebras and their (Bargmann) Fock representations. As an effect of the underlying noncommutative geometry, a length and a momentum scale appear, leading to the existence of nonzero minimal uncertainties in the positions and momenta. The usual quantum mechanical behavior is recovered as a limiting case for not too small and not too large distances and momenta.Keywords
This publication has 13 references indexed in Scilit:
- Free braided differential calculus, braided binomial theorem, and the braided exponential mapJournal of Mathematical Physics, 1993
- Quantum group symmetric Bargmann–Fock space: Integral kernels, Green functions, driving forcesJournal of Mathematical Physics, 1993
- A q-deformed quantum mechanical toy modelPhysics Letters B, 1992
- Quantum group-symmetric fock spaces with bargmann-fock representationLetters in Mathematical Physics, 1992
- Supercovariant systems of q-oscillators and q-supersymmetric hamiltoniansPhysics Letters B, 1991
- Path integral on the quantum planePhysics Letters B, 1991
- Covariant differential calculus on the quantum hyperplaneNuclear Physics B - Proceedings Supplements, 1991
- QUASITRIANGULAR HOPF ALGEBRAS AND YANG-BAXTER EQUATIONSInternational Journal of Modern Physics A, 1990
- On q-analogues of the quantum harmonic oscillator and the quantum group SU(2)qJournal of Physics A: General Physics, 1989
- Twisted second quantizationReports on Mathematical Physics, 1989