The failure of rational dilation on the tetrablock

Abstract

We show by a counter example the failure of rational dilation on the tetrablock, a polynomially convex and non-convex domain in C3, defined as E = \ (x1,x2,x3)∈ C3\,:\, 1-zx1-wx2+zwx3≠ 0 whenever |z|≤ 1, |w|≤ 1 \. A commuting triple of operators (T1,T2,T3) for which the closed tetrablock E is a spectral set, is called an E-contraction. For an E-contraction (T1,T2,T3), the two operator equations T1-T2*T3=DT3X1DT3 and T2-T1*T3= DT3X2DT3, DT3=(I-T3*T3)12, have unique solutions A1,A2 on DT3=Ran DT3 and they are called the fundamental operators of (T1,T2,T3). For a particular class of E-contractions, we prove it necessary for the existence of rational dilation that the corresponding fundamental operators A1,A2 satisfy the conditions equationabstract A1A2=A2A1 and A1*A1-A1A1*=A2*A2-A2A2*. equation Then we construct an E-contraction from that particular class which fails to satisfy (abstract). We produce a concrete functional model for pure E-isometries, a class of E-contractions analogous to the pure isometries in one variable. The fundamental operators play the main role in this model.