Keith H. Burns
Affiliations: | Mathematics | Northwestern University, Evanston, IL |
Area:
Mathematics, Applied MathematicsGoogle:
"Keith Burns"
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Publications
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| Burns K, Climenhaga V, Fisher T, et al. (2018) Unique equilibrium states for geodesic flows in nonpositive curvature Geometric and Functional Analysis. 28: 1209-1259 |
| Burns KH, Masur H, Matheus C, et al. (2017) Rates of mixing for the Weil-Petersson geodesic flow I: no rapid mixing in non-exceptional moduli spaces Advances in Mathematics. 306: 589-602 |
| Burns K, Masur H, Matheus C, et al. (2017) Rates of mixing for the Weil–Petersson geodesic flow: exponential mixing in exceptional moduli Spaces Geometric and Functional Analysis. 27: 240-288 |
| Burns K, Gelfert K. (2013) Lyapunov spectrum for geodesic flows of rank 1 surfaces Discrete and Continuous Dynamical Systems. 34: 1841-1872 |
| Burns K, Masur H, Wilkinson A. (2012) The Weil-Petersson geodesic flow is ergodic Annals of Mathematics. 175: 835-908 |
| Burns K, Hasselblatt B. (2011) The sharkovsky theorem: A natural direct proof American Mathematical Monthly. 118: 229-244 |
| Burns K, Gutkin E. (2008) Growth of the number of geodesics between points and insecurity for Riemannian manifolds Discrete and Continuous Dynamical Systems. 21: 403-413 |
| Burns KH, Pollicott M. (2003) Stable Ergodicity and Frame Flows Geometriae Dedicata. 98: 189-210 |
| Burns KH, Paternain GP. (2002) Anosov magnetic flows, critical values and topological entropy Nonlinearity. 15: 281-314 |
| Burns K, Weiss H. (2002) Spheres with positive curvature and nearly dense orbits for the geodesic flow Ergodic Theory and Dynamical Systems. 22: 329-348 |