Commutator estimates on contact manifolds and applications
Journal article, 2019
This article studies sharp norm estimates for the commutator of pseudo-differential operators with multiplication operators on closed Heisenberg manifolds. In particular, we obtain a Calderon commutator estimate: If D is a first-order operator in the Heisenberg calculus and f is Lipschitz in the Carnot-Caratheodory metric, then [D, f] extends to an L-2-bounded operator. Using interpolation, it implies sharp weak-Schatten class properties for the commutator between zeroth order operators and Holder continuous functions. We present applications to sub-Riemannian spectral triples on Heisenberg manifolds as well as to the regularization of a functional studied by Englis-Guo-Zhang.
Heisenberg calculus
weak Schatten norm estimates
hypoelliptic operators
Hankel operators
Commutator estimates
Connes metrics
Author
Heiko Gimperlein
Heriot-Watt University
Padernborn University
Magnus C H T Goffeng
Chalmers, Mathematical Sciences, Analysis and Probability Theory
University of Gothenburg
Journal of Noncommutative Geometry
1661-6952 (ISSN) 1661-6960 (eISSN)
Vol. 13 1 363-406Subject Categories
Algebra and Logic
Geometry
Mathematical Analysis
Roots
Basic sciences
DOI
10.4171/JNCG/326