A generalization of the Gauss-Bonnet and Hopf-Poincar\'e theorems. Part II

Abstract

This paper is a continuation of the paper F. A. Arias and M. Malakhaltsev "A generalization of the Gauss-Bonnet and Hopf-Poincar\'e theorems", ArXiv:1510.01395 [MathDG] 5 Oct 2015. Let π : E M be a locally trivial fiber bundle over a two-dimensional manifold M, and ⊂ M be a discrete subset. A subset Q ⊂ E is called an n-sheeted branched section of the bundle π if Q' = π-1(M ) Q is a n-sheeted covering of M . The set is called the singularity set of the branched section Q. We define the index of a singularity point of a branched section, and give examples of its calculation, in particular for branched sections of the projective tangent bundle of M determined by binary differential equations. Also we define a resolution of singularities of a branched section, and prove an analog of Hopf-Poincar\'e-Gauss-Bonnet theorem for the branched sections admitting a resolution.