The Geometry of Spherically Symmetric Finsler Manifolds, 1st ed. 2018 SpringerBriefs in Mathematics Series
Auteurs : Guo Enli, Mo Xiaohuan
This book presents properties, examples, rigidity theorems and classification results of such Finsler metrics. In particular, this book introduces how to investigate spherically symmetric Finsler geometry using ODE or PDE methods. Spherically symmetric Finsler geometry is a subject that concerns domains in R^n with spherically symmetric metrics.
Recently, a significant progress has been made in studying Riemannian-Finsler geometry. However, constructing nice examples of Finsler metrics turn out to be very difficult. In spherically symmetric Finsler geometry, we find many nice examples with special curvature properties using PDE technique. The studying of spherically symmetric geometry shows closed relation among geometry, group and equation.
Provides broader examples of Finsler metrics with nice curvature properties
Establishes a lot of beautiful classification theorems
Presents PDE method to study Riemann-Finsler geometry
Date de parution : 10-2018
Ouvrage de 154 p.
15.5x23.5 cm