Homoclinic bifurcation in Morse-Novikov theory, a doubling phenomenon

TL;DR

This paper studies the dynamics of gradient flows of closed, non-exact 1-forms on manifolds, revealing a homoclinic bifurcation phenomenon that affects the Morse-Novikov complex and involves a doubling effect.

Contribution

It introduces the analysis of homoclinic bifurcations in Morse-Novikov theory, highlighting a doubling phenomenon and the structure of the codimension-one stratum in the gradient space.

Findings

Identification of a codimension-one stratum with homoclinic orbits

Description of the bifurcation and its algebraic effects on the complex

Link between simple and double energy homoclinic orbits

Abstract

We consider a compact manifold of dimension greater than 2 and a differential form of degree one which is closed but non-exact. This form, viewed as a multi-valued function has a gradient vector field with respect to any Riemannian metric. After S. Novikov's work and a complement by J.-C. Sikorav, under some genericity assumptions these data yield a complex, called today the Morse-Novikov complex. Due to the non-exactness of the form, its gradient has a non-trivial dynamics in contrary to gradients of functions. In particular, it is possible that the gradient has a homoclinic orbit. The one-form being fixed, we investigate the codimension-one stratum in the space of gradients which is formed by gradients having one simple homoclinic orbit. Such a stratum S breaks up into a left and a right part separated by a substratum. The algebraic effect on the Morse-Novikov complex of crossing S depends on the part, left or right, which is crossed. The sudden creation of infinitely many new heteroclinic orbits may happen. Moreover, some gradients with a simple homoclinic orbit are approached by gradients with a simple homoclinic orbit of double energy. These two phenomena are linked.