The virtual singular twin monoid and group: presentations and representations

Abstract

In this article, we introduce the algebraic definitions and presentations of the virtual singular twin monoid and virtual singular twin group, denoted by VSTMn and VSTn, respectively, for a positive integer n. These structures extend the twin group Tn in close analogy to how the virtual singular braid monoid and virtual singular braid group extend the classical braid group. We then construct and study representations of the group VSTn, for n ≥ 3, focusing in particular on extending the representations η1 and η2 of Tn, introduced by M. Nasser, to VSTn via the 2-local extension method. To analyze the resulting representations, η1' and η2', and their properties, we establish necessary and sufficient conditions for irreducibility and show that both η1' and η2' are unfaithful. Additionally, we classify all complex homogeneous 2-local representations of VSTn for every integer n≥ 3, providing a foundation for further investigation into representations of VSTn.