Analytic m-isometries and weighted Dirichlet-type spaces

Abstract

Corresponding to any (m-1)-tuple of semi-spectral measures on the unit circle, a weighted Dirichlet-type space is introduced and studied. We prove that the operator of multiplication by the coordinate function on these weighted Dirichlet-type spaces acts as an analytic m-isometry and satisfies a certain set of operator inequalities. Moreover, it is shown that an analytic m-isometry which satisfies this set of operator inequalities can be represented as an operator of multiplication by the coordinate function on a weighted Dirichlet-type space induced from an (m-1)-tuple of semi-spectral measures on the unit circle. This extends a result of Richter as well as of Olofsson on the class of analytic 2-isometries. We also prove that all left invertible m-concave operators satisfying the aforementioned operator inequalities admit a Wold-type decomposition. This result serves as a key ingredient to our model theorem and also generalizes a result of Shimorin on a class of 3-concave operators.