Cancellation for (G,n)-complexes and the Swan finiteness obstruction

Abstract

In previous work, we related homotopy types of finite (G,n)-complexes when G has periodic cohomology to projective Z G-modules representing the Swan finiteness obstruction. We use this to determine when X Sn Y Sn implies X Y for finite (G,n)-complexes X and Y, and give lower bounds on the number of homotopically distinct pairs when this fails. The proof involves constructing projective Z G-modules as lifts of locally free modules over orders in products of quaternion algebras, whose existence follows from the Eichler mass formula. In the case n=2, difficulties arise which lead to a new approach to finding a counterexample to Wall's D2 problem.