Strongly Doubly Reversible Pairs in Quaternionic Unitary Group of Signature (n,1)

Abstract

Let (n,1) denote the isometry group of the quaternionic hyperbolic space Hn. A pair (g1,g2) (n,1) is strongly doubly reversible if (g1,g2) and (g1-1,g2-1) are simultaneously conjugate in (n,1) by an involution. Equivalently, there exist involutions i1,i2,i3 ∈ (n,1) such that g1 = i1 i2, g2 = i1 i3. We prove that the set of such pairs has Haar measure zero in (n,1) × (n,1). The same result also holds for (n) × (n) for n≥ 2. In the special case n=1, we show that every pair of elements in (1) is strongly doubly reversible. Applying this result, we give a shorter proof of a theorem of Basmajian and Maskit showing that every pair of elements in SO(4) is strongly doubly reversible. Furthermore, we derive the necessary conditions for a pair of hyperbolic elements in (1,1) to be strongly doubly reversible and provide a quantitative characterization of such pairs.

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