On the K-theory of boundary C*-algebras of A2 groups
Abstract
Let be an A2 subgroup of 3( K), where K is a local field with residue field of order q. The module of coinvariants C( P2 K, Z) is shown to be finite, where P2 K is the projective plane over K. If the group is of Tits type and if q 1 3 then the exact value of the order of the class [I]K0 in the K-theory of the (full) crossed product C*-algebra C() is determined, where is the Furstenberg boundary of 3( K). For groups of Tits type, this verifies a conjecture of G. Robertson and T. Steger.
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