Hilbert space operators with two-isometric dilations

Abstract

A bounded linear Hilbert space operator S is said to be a 2-isometry if the operator S and its adjoint S* satisfy the relation S*2S2 - 2 S*S + I = 0. In this paper, we study Hilbert space operators having liftings or dilations to 2-isometries. The adjoint of an operator which admits such liftings is characterized as the restriction of a backward shift on a Hilbert space of vector-valued analytic functions. These results are applied to concave operators (i.e., operators S such that S*2S2 - 2 S*S + I 0) and to operators similar to contractions or isometries. Two types of liftings to 2-isometries, as well as the extensions induced by them, are constructed and isomorphic minimal liftings are discussed.