Rational dilation of tetrablock contractions revisited

Abstract

A classical result of Sz.-Nagy asserts that a Hilbert-space contraction operator T can be lifted to an isometry V. A more general multivariable setting of recent interest for these ideas is the case where (i) the unit disk is replaced by a certain domain contained in C3 (called the tetrablock), (ii) the contraction operator T is replaced by a commutative triple (T1, T2, T) of Hilbert-space operators having E as a spectral set (a tetrablock contraction) . The rational dilation question for this setting is whether a tetrablock contraction (T1, T2, T) can be lifted to a tetrablock isometry (V1, V2, V) (a commutative operator tuple which extends to a tetrablock-unitary tuple (U1, U2, U)---a commutative tuple of normal operators with joint spectrum contained in the distinguished boundary of the tetrablock). We discuss necessary conditions for a tetrablock contraction to have a tetrablock-isometric lift. We present an example of a tetrablock contraction which does have a tetrablock-isometric lift but violates a condition previously thought to be necessary for the existence of such a lift. Thus the question of whether a tetrablock contraction always has a tetrablock-isometric lift appears to be unresolved at this time.