Wold decomposition for isometries with equal range

Abstract

Let n ≥ 2, and let V=(V1,…, Vn) be an n-tuple of isometries acting on a Hilbert space H. We say that V is an n-tuple of isometries with equal range if VimiVjmjH = Vjmj VimiH and Vi*miVjmj H = Vjmj Vi*miH for mi,mj ∈ Z+, where 1 ≤ i<j ≤ n. We prove that each n-tuple of isometries with equal range admits a unique Wold decomposition. We obtain analytic models of the above class, and as a consequence, we show that the wandering data are complete unitary invariants for n-tuples of isometries with equal range. Our results unify all prior findings on the decomposition for tuples of isometries in the existing literature.