Function theory off the complexified unit circle: Fréchet space structure and automorphisms

Authors

  • Michael Heins University of Würzburg, Department of Mathematics
  • Annika Moucha University of Würzburg, Department of Mathematics
  • Oliver Roth University of Würzburg, Department of Mathematics

Keywords:

Schauder basis, invariant Laplacian, conformal invariance

Abstract

Motivated by recent work on strict deformation quantization of the unit disk and the Riemann sphere, we study the Fréchet space structure of the set of holomorphic functions on the complement \(\Omega:=\{(z,w)\in \hat{\mathbb{C}}^2\colon z\cdot w\not=1\}\) of the complexified unit circle \(\{(z,w) \in \hat{\mathbb{C}}^2 \colon z\cdot w=1\}\). We also characterize the subgroup of all biholomorphic automorphisms of \(\Omega\) which leave the canonical Laplacian on \(\Omega\) invariant.
Section
Articles

Published

2024-04-10

How to Cite

Heins, M., Moucha, A., & Roth, O. (2024). Function theory off the complexified unit circle: Fréchet space structure and automorphisms. Annales Fennici Mathematici, 49(1), 257–280. https://doi.org/10.54330/afm.144880