Operators associated with the pentablock and their relations with biball and symmetrized bidisc

Abstract

A commuting triple of Hilbert space operators (A,S,P) is said to be a P-contraction if the closed pentablock P is a spectral set for (A,S,P), where \[ P:=\(a21, tr(A0), det(A0))\ : \ A0=[aij]2 × 2 \; \; \& \;\; \|A0\| <1 \ ⊂eq C3. \] A commuting triple of normal operators (A, S, P) acting on a Hilbert space is said to be a P-unitary if the Taylor-joint spectrum σT(A, S, P) of (A, S, P) is contained in the distinguished boundary bP of . Also, (A, S , P) is called a P-isometry if it is the restriction of a P-unitary ( A, S, P) to a joint invariant subspace of A, S, P. We find several characterizations for the P-unitaries and P-isometries. We show that every P-isometry admits a Wold type decomposition that splits it into a direct sum of a P-unitary and a pure P-isometry. Moving one step ahead we show that every P-contraction (A,S,P) possesses a canonical decomposition that orthogonally decomposes (A,S,P) into a P-unitary and a completely non-unitary P-contraction. We find a necessary and sufficient condition such that a P-contraction (A, S, P) dilates to a P-isometry (X, T, V) with V being the minimal isometric dilation of P. Then we show an explicit construction of such a conditional dilation. We show interplay between operator theory on the following three domains: the pentablock, the biball and the symmetrized bidisc.