Necessary conditions for existence of $Γ_n$-contractions and examples of $Γ_3$-contractions (2108.10635v1)

Abstract: The fundamental result of B. Sz. Nazy states that every contraction has a coisometric extension and a unitary dilation. The isometric dilation of a contraction on a Hilbert space motivated whether this theory can be extended sensibly to families of operators. It is natural to ask whether this idea can be generalized, where the contraction $T$ is substituted by a commuting $n$-tuples of operators $(S_1,\cdots, S_n)$ acting on some Hilbert space having $\Gamma_n$ as a spectral set. We derive the necessary conditions for the existence of a $\Gamma_n$-isometric dilation for $\Gamma_n$-contractions. Also we discuss an example of a $\Gamma_3$-contraction $(S_1, S_2, S_3)$ acting on some Hilbert space $\mathcal H,$ which has a $\Gamma_3$-isometric dilation, but it fails to satisfy the following condition: $$E_1^E_1-E_1E_1^= E_2^E_2-E_2E_2^,$$ where $E_1$ and $E_2$ are the fundamental operators of $(S_1, S_2, S_3),$ $(S_1,S_2)$ is a pair of commuting contractions and $S_3$ is a partial isometry. Thus, the set of sufficient conditions for the existence of a $\Gamma_3$-isometric dilation breaks down, in general, to be necessary, even when the $\Gamma_3$-contraction $(S_1, S_2, S_3)$ has the special structure as described above.