Difference between revisions of "Universality of the Lie-Isotopic Symmetries for Deformed Minkowskian Metrics"
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− | Lie-Isotopic and Lie-admissible theories are based on non-trivial realisation and generalisation of the conventional product and Lie algebra. Various studies are now performed in applying this formalism to metric spaces, gauge theory, classical and quantum mechanics, field theory and quantum groups. Lie-isotopic construction provides consistent generalisations of Hamiltonian mechanics referred to an Birkhoffian mechanics and Birkhoff-Santilli mechanics.[[Category:Scientific Paper]] | + | Lie-Isotopic and Lie-admissible theories are based on non-trivial realisation and generalisation of the conventional product and Lie algebra. Various studies are now performed in applying this formalism to metric spaces, gauge theory, classical and quantum mechanics, field theory and quantum groups. Lie-isotopic construction provides consistent generalisations of Hamiltonian mechanics referred to an Birkhoffian mechanics and Birkhoff-Santilli mechanics. |
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+ | [[Category:Scientific Paper|universality lie-isotopic symmetries deformed minkowskian metrics]] | ||
[[Category:New Energy]] | [[Category:New Energy]] |
Revision as of 11:35, 1 January 2017
Scientific Paper | |
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Title | Universality of the Lie-Isotopic Symmetries for Deformed Minkowskian Metrics |
Author(s) | Askar K Aringazin, K M Aringazin |
Keywords | lie-isotopic theories, deformed, quantum groups, space-time, energy, deformed Minkowskian metrics |
Published | 1994 |
Journal | None |
Pages | 153-161 |
Abstract
Lie-Isotopic and Lie-admissible theories are based on non-trivial realisation and generalisation of the conventional product and Lie algebra. Various studies are now performed in applying this formalism to metric spaces, gauge theory, classical and quantum mechanics, field theory and quantum groups. Lie-isotopic construction provides consistent generalisations of Hamiltonian mechanics referred to an Birkhoffian mechanics and Birkhoff-Santilli mechanics.