Orthogonal decompositions and twisted isometries

Abstract

Let n > 1. Let \Uij\1 ≤ i < j ≤ n be n2 commuting unitaries on some Hilbert space H, and suppose Uji := Uij*, 1 ≤ i < j ≤ n. An n-tuple of isometries V = (V1, … ,Vn) on H is called Un-twisted isometry with respect to \Uij\i<j (or simply Un-twisted isometry if \Uij\i<j is clear from the context) if Vi's are in the commutator \Ust: s ≠ t\', and Vi*Vj=Uij*VjVi*, i ≠ j We prove that each Un-twisted isometry admits a von Neumann-Wold type orthogonal decomposition, and prove that the universal C*-algebra generated by Un-twisted isometry is nuclear. We exhibit concrete analytic models of Un-twisted isometries, and establish connections between unitary equivalence classes of the irreducible representations of the C*-algebras generated by Un-twisted isometries and the unitary equivalence classes of the non-zero irreducible representations of twisted noncommutative tori. Our motivation of Un-twisted isometries stems from the classical rotation C*-algebras, Heisenberg group C*-algebras, and a recent work of de Jeu and Pinto.