Unitary representations of the Roe algebra of a discrete group and symmetries

Abstract

Let be a discrete countable group. Consider the crossed product C-algebra R() = C( l∞()). Let G be a larger discrete group, containing as an almost normal subgroup. Consequently G acts by partial isomorphisms on G and hence on R(). Let RG() be the crossed product C - algebra C(G × (R()). The C-algebra RG() has a natural representation into B( 2()) and hence also admits a representation Q into the Calkin algebra Q( 2()). Let G =× op and assume that is exact. Assume that the non-trivial conjugation orbits under the action of , having non amenable stabilizers, are separated, in a suitable chosen profinite topology, from the identity element in . We also assume natural amenability conditions on the dynamics of the action of × op on cosets of amenable subgroups. Then Q factorises to a representation of C red(G R()). In particular the groups SL3( Z), PGL2( Z[1p]) have the Akemann-Ostrand property. This implies, using the solidity property of Ozawa ([Oz]), that the group von Neumann algebras, L(SL3( Z)) and L(SLn( Z)), n≥ 4, are non-isomorphic.