Multi-welded twin groups

Abstract

For k≥ 1 and n≥ 2, we introduce the multi-welded twin group MkWTn, a natural welded analogue of the multi-virtual twin group. We show that MkWTn arises naturally as a quotient of the universal welded braid group UWn(k), placing it within the unified framework of universal virtual and welded braid-type groups. We establish natural quotient maps relating MkWTn to the multi-virtual twin group MkVTn, the welded twin group WTn, and the corresponding virtual and welded braid-type groups. Several structural properties of MkWTn are obtained. In particular, we compute its abelianization, prove that its commutator subgroup is perfect for n5, and show that the symmetric group Sn is its smallest non-abelian finite quotient. We also investigate the representation theory of MkWTn. In fact, we classify all non-trivial complex homogeneous 2-local representations of MkWTn, showing that only one family survives under the additional twin and welded relations. Furthermore, we classify all non-trivial complex homogeneous 3-local representations of M2WTn. We further investigate the reducibility and faithfulness properties of both the 2-local and 3-local representations.