Local Representations of the Flat Virtual Braid Group
Abstract
We prove that any complex local representation of the flat virtual braid group, , into , has one of the types , . We find necessary and sufficient conditions that guarantee the irreducibility of representations of type , , and we prove that representations of type , , are reducible. Regarding faithfulness, we find necessary and sufficient conditions for representations of type or to be faithful. Moreover, we give sufficient conditions for representations of type , , or to be unfaithful, and we show that representations of type , are unfaithful. We prove that any complex homogeneous local representations of the flat virtual braid group, , into , for , has one of the types , . We then prove that representations of type are reducible for , while representations of type are irreducible if and only if , for . Then, we show that representations of type are unfaithful for and that representations of type are unfaithful if . Furthermore, we prove that any complex homogeneous local representation of the flat virtual braid group, , into , for all , has one of the types , . We prove that these representations are reducible for . Then, we show that representations of types , , are unfaithful, while representations of types or are unfaithful if .
Keywords
Cite
@article{arxiv.2503.06607,
title = {Local Representations of the Flat Virtual Braid Group},
author = {Mohamad N. Nasser and Mohammad Y. Chreif and Malak M. Dally},
journal= {arXiv preprint arXiv:2503.06607},
year = {2026}
}