The lower algebraic K-theory of virtually cyclic subgroups of the braid groups of the sphere and of Z[B\4(S2)]

Abstract

We study K-theoretical aspects of the braid groups B\n(S2) on n strings of the 2-sphere, which by results of the second two authors, are known to satisfy the Farrell-Jones fibred isomorphism conjecture~JM. In light of this, in order to determine the algebraic K-theory of the group ring Z[B\n(S2)], one should first compute that of its virtually cyclic subgroups, which were classified by D.~L.~Gon calves and the first author. We calculate the Whitehead and K\-1-groups of the group rings of the finite subgroups (dicyclic and binary polyhedral) of B\n(S2) for all 4≤ n≤ 11. Some new phenomena occur, such as the appearance of torsion for the K\-1-groups. We then go on to study the case n=4 in detail, which is the smallest value of n for which B\n(S2) is infinite. We show that B\n(S2) is an amalgamated product of two finite groups, from which we are able to determine a universal space for proper actions of the group B\n(S2). We also calculate the algebraic K-theory of the infinite virtually cyclic subgroups of B\n(S2), including the Nil groups of the quaternion group of order 8. This enables us to determine the lower algebraic K-theory of Z[B\n(S2)].