Some Operator Bounds Employing Complex Interpolation Revisited
Abstract
We revisit and extend known bounds on operator-valued functions of the type under various hypotheses on the linear operators and , . We particularly single out the case of self-adjoint and sectorial operators in some separable complex Hilbert space , , and suppose that (resp., ) is a densely defined closed operator mapping into (resp., into ), relatively bounded with respect to (resp., ). Using complex interpolation methods, a generalized polar decomposition for , and Heinz's inequality, the bounds we establish lead to inequalities of the following type, \begin{align*} & \big\|\ol{T_2^{-x}ST_1^{-1+x}}\big\|_{\cB(\cH_1,\cH_2)} \leq N_1 N_2 e^{(\theta_1 + \theta_2) [x(1-x)]^{1/2}} \\ & \quad \times \big\|ST_1^{-1}\big\|_{\cB(\cH_1,\cH_2)}^{1-x} \, \big\|S^*(T_2^*)^{-1}\big\|_{\cB(\cH_2,\cH_1)}^{x}, \quad x \in [0,1], \end{align*} assuming that have bounded imaginary powers, that is, for some and We also derive analogous bounds with replaced by trace ideals, , . The methods employed are elementary, predominantly relying on Hadamard's three-lines theorem and Heinz's inequality.
Cite
@article{arxiv.1405.1517,
title = {Some Operator Bounds Employing Complex Interpolation Revisited},
author = {Fritz Gesztesy and Yuri Latushkin and Fedor Sukochev and Yuri Tomilov},
journal= {arXiv preprint arXiv:1405.1517},
year = {2014}
}
Comments
23 pages