Add to ORKGAbstract Let (T 2 , g) be the two-dimensional Riemannian torus. In this paper we prove that the topological entropy of the geodesic flow restricted to the set of initial conditions of minimal geodesics vanishes, independent of the choice of the Riemannian metric
In this note, we consider the minimal entropy problem, namely the question of whether there exists a...
AbstractWe consider a geodesically complete and proper Hadamard metric measure space X endowed with ...
AbstractLet M be a closed and connected manifold equipped with a C∞ Riemannian metric. Using the geo...
In der vorliegenden Arbeit wird das Verhalten von Geodätischen auf einem zwei-dimensionalen Torus mi...
We look for metrics on the torus T^2 that minimize the complexity. Since the topological entropy may...
Abstract. The geodesic flow of the flat metric on a torus is minimizing the polynomial entropy among...
In the study of surfaces and closed geodesics an important characteristic is the topological entropy...
AbstractOur main result is that for a minimal flow φ on a compact manifold M, either M is a torus an...
We show the equivalences of several notions of entropy, like a version of the topological entropy of...
Our main result is that a minimal flow on a compact manifold is either topologically conjugate to a ...
Abstract. We show that the set of C ∞ riemannian metrics on S2 or RP 2 whose geodesic flow has posit...
AbstractWe prove topological transitivity for the Weil–Petersson geodesic flow for real two-dimensio...
On every closed contact manifold there exist contact forms with volume one whose Reeb flows have arb...
Dette er forfatternes aksepterte versjon. This is the author’s final accepted manuscript.We exhi...
Motivated by the close relation between Aubry-Mather theory and minimal geodesies on a 2-torus we st...
In this note, we consider the minimal entropy problem, namely the question of whether there exists a...
AbstractWe consider a geodesically complete and proper Hadamard metric measure space X endowed with ...
AbstractLet M be a closed and connected manifold equipped with a C∞ Riemannian metric. Using the geo...
In der vorliegenden Arbeit wird das Verhalten von Geodätischen auf einem zwei-dimensionalen Torus mi...
We look for metrics on the torus T^2 that minimize the complexity. Since the topological entropy may...
Abstract. The geodesic flow of the flat metric on a torus is minimizing the polynomial entropy among...
In the study of surfaces and closed geodesics an important characteristic is the topological entropy...
AbstractOur main result is that for a minimal flow φ on a compact manifold M, either M is a torus an...
We show the equivalences of several notions of entropy, like a version of the topological entropy of...
Our main result is that a minimal flow on a compact manifold is either topologically conjugate to a ...
Abstract. We show that the set of C ∞ riemannian metrics on S2 or RP 2 whose geodesic flow has posit...
AbstractWe prove topological transitivity for the Weil–Petersson geodesic flow for real two-dimensio...
On every closed contact manifold there exist contact forms with volume one whose Reeb flows have arb...
Dette er forfatternes aksepterte versjon. This is the author’s final accepted manuscript.We exhi...
Motivated by the close relation between Aubry-Mather theory and minimal geodesies on a 2-torus we st...
In this note, we consider the minimal entropy problem, namely the question of whether there exists a...
AbstractWe consider a geodesically complete and proper Hadamard metric measure space X endowed with ...
AbstractLet M be a closed and connected manifold equipped with a C∞ Riemannian metric. Using the geo...