Presentations and Representations of the Multi-Virtual Twin Group and Associated Subgroups

TL;DR

This paper introduces the multi-virtual twin group and its subgroups, classifies all homogeneous 2-local representations into GL_n(C), and explores their properties, including faithfulness and irreducibility.

Contribution

It defines new groups related to virtual braid groups, classifies their 2-local representations, and analyzes their main properties, providing a foundation for future research.

Findings

All homogeneous 2-local representations of M_kVT_n are classified into eight types.

Most 2-local representations are unfaithful.

Conditions for irreducibility of induced representations are established.

Abstract

Motivated by the notion of the multi-virtual braid group introduced by L. Kauffman and by the study of extensions of the well-known twin group T_n, n >= 2, we introduce a new group called the multi-virtual twin group M_kVT_n, where k >= 1 and n >= 2, together with two associated subgroups: the multi-virtual pure twin group M_kVPT_n and the multi-virtual semi-pure twin group M_kVHT_n.We classify all homogeneous 2-local representations of M_kVT_n into GL_n(C) for all k >= 1 and n >= 3, and show that they fall into exactly eight distinct types. We also investigate their main properties, including faithfulness and irreducibility, proving that they are generally unfaithful and providing necessary and sufficient conditions for their irreducibility.Furthermore, for certain values of k and n, we construct non-local representations of M_kVPT_n induced from those of M_kVT_n, and we determine the conditions under which these induced representations are irreducible. Finally, we present several problems for future research in this area.