Primary singularities of vector fields on surfaces
Abstract
Unless another thing is stated one works in the category and manifolds have empty boundary. Let and be vector fields on a manifold . We say that tracks if for some continuous function . A subset of the zero set is an essential block for if it is non-empty, compact, open in and its Poincar\'e-Hopf index does not vanishes. One says that is non-flat at if its -jet at is non-trivial. A point of is called a primary singularity of if any vector field defined about and tracking vanishes at . This is our main result: Consider an essential block of a vector field defined on a surface . Assume that is non-flat at every point of . Then contains a primary singularity of . As a consequence, if is a compact surface with non-zero characteristic and is nowhere flat, then there exists a primary singularity of .
Keywords
Cite
@article{arxiv.1807.04533,
title = {Primary singularities of vector fields on surfaces},
author = {Morris W. Hirsch and Francisco-Javier Turiel},
journal= {arXiv preprint arXiv:1807.04533},
year = {2018}
}