Quantum Differentiation and Index Theorems

Schulz-Baldes H, Stoiber T (2022)


Publication Type: Book chapter / Article in edited volumes

Publication year: 2022

Publisher: Springer

Series: Mathematical Physics Studies

Book Volume: Part F1111

Pages Range: 41-81

DOI: 10.1007/978-3-031-12201-9_3

Abstract

As already stressed in the overview in Preface, this chapter is the mathematical core of this book. In the next Sect. 3.1 the Hankel and Toeplitz operators associated to a W -dynamical system are introduced and then the traceclass Peller criterion is proved. Combining an L2 -criterion with interpolation theory, Sect. 3.2 then proves Peller criteria for higher Schatten classes.

Authors with CRIS profile

How to cite

APA:

Schulz-Baldes, H., & Stoiber, T. (2022). Quantum Differentiation and Index Theorems. In (pp. 41-81). Springer.

MLA:

Schulz-Baldes, Hermann, and Tom Stoiber. "Quantum Differentiation and Index Theorems." Springer, 2022. 41-81.

BibTeX: Download