Counting periodic orbits of vector fields over smooth closed manifolds

Abstract

We address the problem of counting periodic orbits of vector fields on smooth closed manifolds. The space of non-constant periodic orbits is enlarged to a complete space by adding the ghost orbits, which are decorations of the zeros of vector fields. Associated with any compact and open subset of the moduli space of periodic and ghost orbits, we define an integer weight. When the vector field moves along a path, and deforms in a compact and open family, we show that the weight function stays constant. We also give a number of examples and computations, which illustrate the applications of our main theorem.