The Domain of Attraction of the Desired Path in Vector-field Guided Path Following

In the vector-field guided path-following problem, a sufficiently smooth vector field is designed such that its integral curves converge to and move along a one-dimensional geometric desired path. The existence of singular points where the vector field vanishes creates a topological obstruction to global convergence to the desired path and some associated topological analysis has been conducted in our previous work. In this paper, we strengthen the result in our previous work by showing that the domain of attraction of the desired path, which is a compact asymptotically stable one-dimensional embedded submanifold of an \(n\)-dimensional ambient manifold \(\mathcal{M}\), is homeomorphic to \(\mathbb{R}^{n-1} \times \mathbb{S}^1\), and not just homotopy equivalent to \(\mathbb{S}^1\). This result is extended for a \(k\)-dimensional compact manifold for \(k \ge 2\).