On Universal Virtual and Welded Braid Groups and Their Linear Representations

Abstract

We introduce linear representations of the universal virtual braid group UVn(c), where n≥ 2 and c≥ 1, which is a unifying framework for braid-type groups with multiple types of crossings. We classify and study its complex homogeneous 2-local representations for all n≥ 3 and c≥ 1 (unique up to equivalence) and complex homogeneous 3-local representations for all n≥ 4 and c=2 (four distinct families). We then introduce the universal welded braid group UWn(c) as a quotient of UVn(c) by the welded relations. This group recovers all known welded-type groups as quotients. We prove that UWn(c) has abelianization Zc Z2, perfect commutator subgroup for n ≥ 5, trivial center, and Sn as its smallest non-abelian finite quotient. Finally, we classify and study the complex homogeneous 2-local representations of UWn(c) for all n≥ 3 and c≥ 1, obtaining three distinct families.