Reversibility of Hermitian Isometries

Abstract

An element g in a group G is called reversible (or real) if it is conjugate to g-1 in G, i.e., there exists h in G such that g-1=hgh-1. The element g is called strongly reversible if the conjugating element h is an involution (i.e., element of order at most two) in G. In this paper, we classify reversible and strongly reversible elements in the isometry groups of F-Hermitian spaces, where F=C or H. More precisely, we classify reversible and strongly reversible elements in the groups Sp(n) Hn, U(n) Cn and SU(n) Cn. We also give a new proof of the classification of strongly reversible elements in Sp(n).