Strongly real classes in finite unitary groups of odd characteristic

Abstract

We classify all strongly real conjugacy classes of the finite unitary group (n, Fq) when q is odd. In particular, we show that g ∈ (n, Fq) is strongly real if and only if g is an element of some embedded orthogonal group O(n, Fq). Equivalently, g is strongly real in (n, Fq) if and only if g is real and every elementary divisor of g of the form (t 1)2m has even multiplicity. We apply this to obtain partial results on strongly real classes in the finite symplectic group (2n, Fq), q odd, and a generating function for the number of strongly real classes in (n, Fq), q odd, and we also give partial results on strongly real classes in (n, Fq) when q is even.