Computation of the Scharlau Invariant, I

Abstract

The Scharlau invariant determines whether or not a finite group has a fixed point free representation over a field:\ \ if 0, yes, otherwise, no. Until now it was known to be one of 0, 1, p, p2 for p a prime dividing the order of the group. We eliminate p2 as a possibility. Work of Scharlau [Sch] reduces the question to the above list with p2 being possible for the groups SL2( Zp) for p a Fermat prime larger than 5. A computation using GAP in the Senior Thesis [Y] of the second author solves the problem for p = 17. With this motivation, we found a short proof of the result not requiring a computer.