Zassenhaus Conjecture on torsion units holds for SL(2,p) and SL(2,p2)

Abstract

H.J. Zassenhaus conjectured that any unit of finite order and augmentation 1 in the integral group ring ZG of a finite group G is conjugate in the rational group algebra QG to an element of G. We prove the Zassenhaus Conjecture for the groups SL(2,p) and SL(2,p2) with p a prime number. This is the first infinite family of non-solvable groups for which the Zassenhaus Conjecture has been proved. We also prove that if G=SL(2,pf), with f arbitrary and u is a torsion unit of ZG with augmentation 1 and order coprime with p then u is conjugate in QG to an element of G. By known results, this reduces the proof of the Zassenhaus Conjecture for this groups to prove that every unit of ZG of order multiple of p and augmentation 1 has actually order p.