On virtual singular braid groups
Abstract
The virtual singular braid group arises as a natural common generalization of classical singular braid groups and virtual braid groups. In this paper, we study several algebraic properties of the virtual singular braid group VSGn. We introduce numerical invariants for virtual singular braids arising from exponent sums of words in VSGn, and describe explicitly the kernels of the associated homomorphisms onto abelian groups. We then determine all group homomorphisms, up to conjugation, from VSGn to the symmetric group Sn, and obtain corresponding semi-direct product decompositions. In the particular case n=2, we provide explicit presentations and algebraic descriptions of the kernels. Moreover, we show that certain relations are forbidden in VSGn, and we introduce and study natural quotients of the virtual singular braid group, including welded and unrestricted versions, for which analogous structural results are obtained.
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