Linear flows and Morse graphs: topological consequences in low dimensions (Q2435374)

A real, invertible, \(d\times d\) matrix \(A\) induces a flow on the Grassmannian manifold \(\mathbb{G}_i\) of \(i\)-dimensional planes in \(\mathbb{R}^d\). The authors investigate this flow using Morse theory, especially in low dimensions \(d=2\), \(d=3\).