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Main Author: Doikou, Anastasia
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2211.00451
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author Doikou, Anastasia
author_facet Doikou, Anastasia
contents We review the discrete evolution problem and the corresponding solution as a discrete Dyson series in order to rigorously derive a generalized discrete version of the Magnus expansion. We also systematically derive the discrete analogue of the pre-Lie Magnus expansion and express the elements of the discrete Dyson series in terms of a tridendriform algebra binary operation. In the generic discrete case, extra significant terms that are absent in the continuous or the linear discrete case appear in both Dyson and Magnus expansions. Based on the rigorous discrete derivation key links between quantum algebras, tridendriform and pre-Lie algebras are then established. This is achieved by examining tensor realizations of quantum groups, such as the Yangian. We show that these realizations can be expressed in terms of tridendriform and pre-Lie algebras. The continuous limit as expected provides the corresponding non-local charges of the Yangian as members of the pre-Lie Magnus expansion.
format Preprint
id arxiv_https___arxiv_org_abs_2211_00451
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Quantum Groups, Discrete Magnus Expansion, Pre-Lie and Tridendriform Algebras
Doikou, Anastasia
Mathematical Physics
Exactly Solvable and Integrable Systems
We review the discrete evolution problem and the corresponding solution as a discrete Dyson series in order to rigorously derive a generalized discrete version of the Magnus expansion. We also systematically derive the discrete analogue of the pre-Lie Magnus expansion and express the elements of the discrete Dyson series in terms of a tridendriform algebra binary operation. In the generic discrete case, extra significant terms that are absent in the continuous or the linear discrete case appear in both Dyson and Magnus expansions. Based on the rigorous discrete derivation key links between quantum algebras, tridendriform and pre-Lie algebras are then established. This is achieved by examining tensor realizations of quantum groups, such as the Yangian. We show that these realizations can be expressed in terms of tridendriform and pre-Lie algebras. The continuous limit as expected provides the corresponding non-local charges of the Yangian as members of the pre-Lie Magnus expansion.
title Quantum Groups, Discrete Magnus Expansion, Pre-Lie and Tridendriform Algebras
topic Mathematical Physics
Exactly Solvable and Integrable Systems
url https://arxiv.org/abs/2211.00451