Z. J. Jablonski, I. B. Jung, J. Stochel
Published 2019-06-12Version 1
In this paper we give necessary and sufficient conditions for a bounded linear Hilbert space operator to be an $m$-isometry for an unspecified $m$ written in terms of conditions that are applied to "one vector at a time". We provide criteria for orthogonality of generalized eigenvectors of an (a priori unbounded) linear operator $T$ on an inner product space that correspond to distinct eigenvalues of modulus 1. We also discuss a similar question of when Jordan blocks of $T$ corresponding to distinct eigenvalues of modulus 1 are "orthogonal".
Classes of operators related to m-isometric operators
A generalized notion of convergence of sequences of subspaces in an inner product space via ideals
A characterisation of inner product spaces by the maximal circumradius of spheres
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