Complexity of Shadows & Traversing Flows in Terms of the Simplicial Volume

Abstract

We combine Gromov's amenable localization technique with the Poincar\'e duality to study the traversally generic vector flows on smooth compact manifolds X with boundary. Such flows generate well-understood stratifications of X by the trajectories that are tangent to the boundary in a particular canonical fashion. Specifically, we get lower estimates of the numbers of connected components of these flow-generated strata of any given codimension. These universal bounds are basically expressed in terms of the normed homology of the fundamental groups π1(D(X)), where D(X) denotes the double of X. The norm here is the Gromov simplicial semi-norm in homology. It turns out that some close relatives of the normed spaces H(D(X); ) form obstructions to the existence of k-convex traversally generic vector flows on X.