Topological entropy and blocking cost for geodesics in riemannian manifolds

Abstract

For a pair of points x,y in a compact, riemannian manifold M let nt(x,y) (resp. st(x,y)) be the number of geodesic segments with length ≤ t joining these points (resp. the minimal number of point obstacles needed to block them). We study relationships between the growth rates of nt(x,y) and st(x,y) as t∞. We derive lower bounds on st(x,y) in terms of the topological entropy h(M) and its fundamental group. This strengthens the results of Burns-Gutkin BG06 and Lafont-Schmidt LS. For instance, by BG06,LS, h(M)>0 implies that s is unbounded; we show that s grows exponentially, with the rate at least h(M)/2.