The structure of doubly non-commuting isometries

Abstract

Suppose that n≥ 1 and that, for all i and j with 1≤ i,j≤ n and i≠ j, zij∈ T are given such that zji=zij for all i≠ j. If V1,…c, Vn are isometries on a Hilbert space such that Vi Vj\!=zij Vj\!Vi for all i≠ j, then (V1,…c,Vn) is called an n-tuple of doubly non-commuting isometries. The generators of non-commutative tori are well-known examples. In this paper, we establish a simultaneous Wold decomposition for (V1,…c,Vn). This decomposition enables us to classify such n-tuples up to unitary equivalence. We show that the joint listing of a unitary equivalence class of a representation of each of the 2n non-commutative tori that are naturally associated with the structure constants is a classifying invariant. A dilation theorem is also established, showing that an n-tuple of doubly non-commuting isometries can be extended to an n-tuple of doubly non-commuting unitary operators on an enveloping Hilbert space.