Pairs of commuting isometries via new core operator
Abstract
We study commuting isometric pairs $(V_1,V_2)$ that admit a factorization of the form $(V_2V_3,\,V_2)$ for some isometry $V_3$.
To investigate this class, we introduce the notion of core operator associated with a commuting isometric pair $(V_1, V_2):$ \begin{equation*} H(V_1, V_2):=V_2V_2^*-V_1V_1^*-V_2^2V_2^{*2}+V_1V_2V_1^*V_2^*. \end{equation*} This core operator is closely associated with the domain Hartogs triangle.
In particular, we establish a model for pure commuting isometric pairs satisfying $H(V_1,V_2)\geq 0$ via the coordinate multiplication operators on a vector-valued Hardy space over the Hartogs triangle.
We also investigate the properties of the core operator and its applications to commuting isometric pairs.
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