The cancellation property for projective modules over integral group rings

Abstract

We obtain a partial classification of the finite groups G for which the integral group ring Z G has projective cancellation, i.e. for which P Z G Q Z G implies P Q for projective Z G-modules P and Q. In particular, we determine when projective cancellation holds for a finite group with no exceptional binary polyhedral quotients. To do this, we prove a cancellation theorem based on a relative version of the Eichler condition. We then use a group theoretic argument to precisely determine the class of groups not covered by this result. The final classification is then obtained by applying results of Swan, Chen and Bley-Hofmann-Johnston which show failure of projective cancellation for certain groups.