Virtual braid groups, virtual twin groups and crystallographic groups

Abstract: Let n ≥ 2. Let V B n (resp. V P n ) be the virtual braid group (resp. the pure virtual braid group), and let V T n (resp. P V T n ) be the virtual twin group (resp. the pure virtual twin group). Let Π be one of the following quotients:is the commutator subgroup of H. In this paper, we show that Π is a crystallographic group and we characterize the elements of finite order and the conjugacy classes of elements in Π. Furthermore, we realize explicitly some Bieberbach groups and infinite virtually cyclic groups i… Show more