Geometric and Harmonic Analysis on Homogeneous Spaces and Applications

Geometric and Harmonic Analysis on Homogeneous Spaces and Applications

TJC 2015, Monastir, Tunisia, December 18-23

Baklouti, Ali; Nomura, Takaaki

Springer International Publishing AG

06/2019

234

Mole

Inglês

9783319879673

15 a 20 dias

It also includes the most recent developments on other areas of mathematics including algebra and geometry. Lie group representation theory and harmonic analysis on Lie groups and on their homogeneous spaces form a significant and important area of mathematical research.
1 Jean Ludwig: Walking with a mathematician.- 2 On q-Gamma and q-Bessel functions.- 3 On the dual topology of the group U(n) x Hn.- 4 Color Lie algebras: Big bracket, Cohomology and Deformations.- 5 A stability theorem for non-abelian actions on threadlike homogeneous spaces.- 6 Quasi-regular representations of two-step nilmanifolds.- 7 Matrix valued commuting differential operators with A2 symmetry.- 8 Translation of harmonic spinors and interacting Weyl fermions on homogeneous spaces. 9 Dimension formula for slice for visible actions on spherical nilpotent orbits in complex simple Lie algebras