Higher order isometric shift operator on the de Branges-Rovnyak space
Abstract
The de Branges-Rovnyak space H(b) is generated by a bounded analytic function b in the unit ball of H∞. When b is a nonextreme point, the space H(b) is invariant by the forward shift operator Mz. We show that the H(b) spaces provide model spaces for expansive quasi-analytic 2n-isometric operators T with T*T - I being rank one. Then we describe the invariant subspaces of the 2n-isometric forward shift operator Mz on H(b).
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