Braidings of Tensor Spaces

Authors :: Oleg Ogievetsky
Thomas Grapperon
Centre de Physique Théorique - UMR 6207 (CPT)
Centre National de la Recherche Scientifique (CNRS)-Université de Toulon (UTLN)-Université de Provence - Aix-Marseille 1-Université de la Méditerranée - Aix-Marseille 2
Centre de Physique Théorique - UMR 7332 (CPT)
Aix Marseille Université (AMU)-Université de Toulon (UTLN)-Centre National de la Recherche Scientifique (CNRS)
Université de la Méditerranée - Aix-Marseille 2-Université de Provence - Aix-Marseille 1-Université de Toulon (UTLN)-Centre National de la Recherche Scientifique (CNRS)
Source :: Letters in Mathematical Physics, Letters in Mathematical Physics, Springer Verlag, 2012, 100 (1), pp.17-28. ⟨10.1007/s11005-011-0533-6⟩, Letters in Mathematical Physics, 2012, 100 (1), pp.17-28. ⟨10.1007/s11005-011-0533-6⟩
Publication Year :: 2010
Publisher :: arXiv, 2010.
Abstract: Let $V$ be a braided vector space, that is, a vector space together with a solution $\hat{R}\in {\text{End}}(V\otimes V)$ of the Yang--Baxter equation. Denote $T(V):=\bigoplus_k V^{\otimes k}$. We associate to $\hat{R}$ a solution $T(\hat{R})\in {\text{End}}(T(V)\otimes T(V))$ of the Yang--Baxter equation on the tensor space $T(V)$. The correspondence $\hat{R}\rightsquigarrow T(\hat{R})$ is functorial with respect to $V$.<br />Comment: 10 pages, no figures

ISSN :: 03779017 and 15730530
Database :: OpenAIRE
Journal :: Letters in Mathematical Physics, Letters in Mathematical Physics, Springer Verlag, 2012, 100 (1), pp.17-28. ⟨10.1007/s11005-011-0533-6⟩, Letters in Mathematical Physics, 2012, 100 (1), pp.17-28. ⟨10.1007/s11005-011-0533-6⟩
Accession number :: edsair.doi.dedup.....4de4fa6746c84fa32c6733bffab7ec73
Full Text :: https://doi.org/10.48550/arxiv.1004.2117