On the number of real classes in the finite projective linear and unitary groups

Abstract

We show that for any n and q, the number of real conjugacy classes in PGL(n, Fq) is equal to the number of real conjugacy classes of GL(n, Fq) which are contained in SL(n, Fq), refining a result of Lehrer, and extending the result of Gill and Singh that this holds when n is odd or q is even. Further, we show that this quantity is equal to the number of real conjugacy classes in PGU(n, Fq), and equal to the number of real conjugacy classes of U(n, Fq) which are contained in SU(n, Fq), refining results of Gow and Macdonald. We also give a generating function for this common quantity.