Lie polynomials in q-deformed Heisenberg algebras RRS Cantuba Journal of Algebra 522, 101-123, 2019 | 12 | 2019 |
A Lie algebra related to the universal Askey-Wilson algebra RRS Cantuba arXiv preprint arXiv:1603.05377, 2016 | 11 | 2016 |
An extension of a q-deformed Heisenberg algebra and its Lie polynomials RRS Cantuba, MAC Merciales Expositiones Mathematicae 39 (1), 1-24, 2021 | 8 | 2021 |
Lie polynomial characterization problems RR Cantuba, S Silvestrov Algebraic Structures and Applications: SPAS 2017, Västerås and Stockholm …, 2020 | 6 | 2020 |
Torsion-Type q-Deformed Heisenberg Algebra and Its Lie Polynomials RR Cantuba, S Silvestrov International Conference on Stochastic Processes and Algebraic Structures …, 2017 | 5 | 2017 |
Lie polynomials in an algebra defined by a linearly twisted commutation relation RRS Cantuba Journal of Algebra and Its Applications 21 (09), 2250175, 2022 | 4 | 2022 |
Compactness property of Lie polynomials in the creation and annihilation operators of the q-oscillator RRS Cantuba Letters in Mathematical Physics 110 (10), 2639-2657, 2020 | 4 | 2020 |
A -deformed Heisenberg algebra as a normed space RRS Cantuba arXiv preprint arXiv:1805.02362, 2018 | 3 | 2018 |
A Casimir element inexpressible as a Lie polynomial RRS Cantuba International Electronic Journal of Algebra 30 (30), 1-15, 2021 | 2 | 2021 |
Lie structure of the Heisenberg-Weyl algebra RRS Cantuba International Electronic Journal of Algebra, 1-29, 2024 | | 2024 |
Littlewood's principles in reverse real analysis. RRS Cantuba Real Analysis Exchange 49 (1), 2024 | | 2024 |
Extended commutator algebra for the -oscillator and a related Askey-Wilson algebra RRS Cantuba Communications in Mathematics 32, 2023 | | 2023 |
Naive Function Theory R Cantuba arXiv preprint arXiv:2302.07078, 2023 | | 2023 |
Ubiquitous Lie polynomials in a two-generator universal enveloping algebra RRS Cantuba arXiv preprint arXiv:1909.02318, 2019 | | 2019 |
Embeddings of a q-deformed Heisenberg algebra in a quantum algebra RRS Cantuba | | |