Three heteroclinic orbits induce a countable family of equivalence classes of regular flows

Abstract

We solve the problem of topological classification for smooth structurally stable flows on closed four-dimensional manifolds, the non-wandering set of which contains exactly two saddle equilibria, and the wandering set contains isolated trajectories connecting these saddle equilibria (heteroclinic curves). In particular, we show that for a flow of the class under consideration on CP2, the number of heteroclinic curves is a complete topological invariant, while on the sphere S4, there exists a countably many equivalence classes with an arbitrary odd number γ≥ 3 of heteroclinic curves. These results contrast with a three-dimensional case, where under similar conditions there exists only finite set of equivalence classes for each number of heteroclinic curves.

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