Title of article :
INTRODUCTION TO A FEW METRIC ASPECTS OF FOLIATION THEORY
Author/Authors :
LANGEVIN, REMI Universite de Bourgogne - Institut de Math´ematiques de Bourgogne, UMR CNRS 5584, France
Abstract :
Foliations can be studied from a dynamical viewpoint, folowing holonomy maps. Here we focus on the geometry of the leaves of codimension one foliations of surfaces of 3- manifolds of constant curvature. The fact that the ambient space is of constant curvature allows us to play the integral geometry games, that is slice with lines, planes etc. We can also consider globally contact points with families of lines, planes etc. That way we obtain theorems about curvature functions defined by the leaves of our foliations.
Keywords :
foliation , Reeb foliation , curvature , Gauss curvature , Gauss map , polar curves , isolated singularity
Journal title :
TWMS Journal of Pure and Applied Mathematics
Journal title :
TWMS Journal of Pure and Applied Mathematics
