Bireflections of the commutator subgroup of an orthogonal group over the reals

Abstract

Let O(p,q) be the orthogonal groups of signature (p,q) over the reals. It is shown that an element of the commutator subgroup O(p,q)' of O(p,q) is bireflectional (product of 2 involutions in O(p,q)') if and only if it is reversible (conjugate to its inverse). Moreover, the bireflectional elements of O(p, q)' are classified.

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