A solvable counterexample to the Hambleton-Taylor-Williams Conjecture

Abstract

I. Hambleton, L. Taylor and B. Williams conjectured a general formula in spirit of H. Lenstra for the decomposition of Gn(RG) for any finite group G and noetherian ring R. The conjectured decomposition was shown to hold for some large classes of finite groups. D. Webb and D. Yao discovered that the conjecture failed for the symmetric group S5, but remarked that it still might be reasonable to expect the HTW-decomposition for solvable groups. In this paper we show that the solvable group SL(2,F3) is also a counterexample to the conjectured HTW-decomposition. Furthermore, we prove that for any finite group G the rank of G1(ZG) does not exceed the rank of the expression in the HTW-decomposition.