AMS eBook CollectionsOne of the world's most respected mathematical collections, available in digital format for your library or institution
Laguerre Calculus and Its Applications on the Heisenberg Group
About this Title
Carlos Berenstein, University of Maryland, College Park, MD, Der-Chen Chang, Georgetown University, Washington, DC and Jingzhi Tie, University of Georgia, Athens, GA
Publication: AMS/IP Studies in Advanced Mathematics
Publication Year:
2001; Volume 22
ISBNs: 978-0-8218-2761-1 (print); 978-1-4704-3812-8 (online)
DOI: https://doi.org/10.1090/amsip/022
MathSciNet review: MR1847855
MSC: Primary 32A50; Secondary 22E30, 32W05, 42C10, 43A80
Table of Contents
Front/Back Matter
Chapters
- The Laguerre calculus
- Estimates for powers of the sub-Laplacian
- Estimates for the spectrum projection operators of the sub-Laplacian
- The inverse of the operator $\square _{\alpha } = {\sum }^n_{j=1}({X^2_j} - {X^2_{j+n}}) - 2i{\alpha }$T
- The explicit solution of the $\bar {\partial }$-Neumann problem in a non-isotropic Siegel domain
- Injectivity of the Pompeiu transform in the isotropic H$_n$
- Morera-type theorems for holomorphic $\mathcal H^p$ spaces in H$_n$ (I)
- Morera-type theorems for holomorphic $\mathcal H^p$ spaces in H$_n$ (II)