Estimating Dixmier traces of Hankel operators in Lorentz ideals
Journal article, 2020
In this paper we study Dixmier traces of powers of Hankel operators in Lorentz ideals. We extend results of Engliš-Zhang to the case of powers p≥1 and general Lorentz ideals starting from abstract extrapolation results of Gayral-Sukochev. In the special case p=2,4,6 we give an exact formula for the Dixmier trace. For general p, we give upper and lower bounds on the Dixmier trace. We also construct, for any p and any Lorentz ideal, examples of non-measurable Hankel operators.
Von Neumann algebra
Besov space
Dixmier trace
Hankel operator
banach limit
Hardy space
Author
Magnus C H T Goffeng
Chalmers, Mathematical Sciences, Analysis and Probability Theory
Alexandr Usachev
Central South University
Journal of Functional Analysis
0022-1236 (ISSN) 1096-0783 (eISSN)
Vol. 279 7 108688Subject Categories
Algebra and Logic
Geometry
Mathematical Analysis
DOI
10.1016/j.jfa.2020.108688