Decomposition of complex hyperbolic isometries by involutions

Abstract

A k-reflection of the n-dimensional complex hyperbolic space Hn is an element in U(n,1) with negative type eigenvalue λ, |λ|=1, of multiplicity k+1 and positive type eigenvalue 1 of multiplicity n-k. We prove that a holomorphic isometry of Hn is a product of at most four involutions and a complex k-reflection, k ≤ 2. Along the way, we prove that every element in SU(n) is a product of four or five involutions according as n ≠ 2 4 or n = 2 4. We also give an easy proof of the result that every holomorphic isometry of Hn is a product of two anti-holomorphic involutions.