English

Primary singularities of vector fields on surfaces

Dynamical Systems 2018-07-13 v1

Abstract

Unless another thing is stated one works in the CC^\infty category and manifolds have empty boundary. Let XX and YY be vector fields on a manifold MM. We say that YY tracks XX if [Y,X]=fX[Y,X]=fX for some continuous function f ⁣:MRf\colon M\rightarrow\mathbb R. A subset KK of the zero set Z(X){\mathsf Z}(X) is an essential block for XX if it is non-empty, compact, open in Z(X){\mathsf Z}(X) and its Poincar\'e-Hopf index does not vanishes. One says that XX is non-flat at pp if its \infty-jet at pp is non-trivial. A point pp of Z(X){\mathsf Z}(X) is called a primary singularity of XX if any vector field defined about pp and tracking XX vanishes at pp. This is our main result: Consider an essential block KK of a vector field XX defined on a surface MM. Assume that XX is non-flat at every point of KK. Then KK contains a primary singularity of XX. As a consequence, if MM is a compact surface with non-zero characteristic and XX is nowhere flat, then there exists a primary singularity of XX.

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}
}
R2 v1 2026-06-23T02:58:46.817Z