Polytopes and C0-Riemannian metrics with positive h top

Abstract

We study Reeb dynamics on starshaped hypersurfaces in R4 arising as smoothings of starshaped polytopes. Using the C0--stability of positive topological entropy for Reeb flows in dimension three from our joint work with Dahinden and Pirnapasov, we show that there exist starshaped polytopes P such that for any starshaped smoothing of ∂ P the associated Reeb flows have positive topological entropy. This answers a question of Ostrover and Ginzburg. Similarly, we show that given a closed surface M and a number C>0, there exist continuous and non-differentiable Riemannian metrics g on S with h top>C in the sense that for any smoothing of g the associated geodesic flows have h top>C.