- GEOMETRY OF THE COMPLEX OF CURVES II: HIERARCHICAL STRUCTURE
- CRITERIA FOR THE DIVERGENCE OF PAIRS OF TEICHMULLER ANNA LENZHEN AND HOWARD MASUR
- Teichmuller geometry of moduli space, II: M(S) seen from far away
- Publications de l'IHES, Vol. 97 no.1 (2003), pp. 61{179.
- Billiards in rectangles with barriers Alex Eskin , Howard Masur y and Martin Schmoll
- Coarse and synthetic Weil-Petersson geometry: quasi-flats, geodesics, and
- Asymptotics of Weil-Petersson geodesics I: ending laminations, recurrence, and flows
- QUASICONVEXITY IN THE CURVE COMPLEX HOWARD MASUR AND YAIR MINSKY
- THE WEIL-PETERSSON GEODESIC FLOW IS ERGODIC K. BURNS, H. MASUR AND A. WILKINSON
- Spaces of Kleinian Groups Cambridge University Press, 2004 Lond. Math. Soc. Lec. Notes xxx, 110 Y. Minsky, M. Sakuma & C. Series (Eds.)
- Geometry of Teichmuller space with the Teichmuller metric Howard Masur
- TOPOLOGICAL DICHOTOMY AND STRICT ERGODICITY FOR TRANSLATION SURFACES
- GEOMETRY OF THE COMPLEX OF CURVES I: HYPERBOLICITY
- [Zi2] R. Zimmer, Kazhdan groups acting on compact manifolds, In vent. Math. 75 (1984), p.425436.
- DICHOTOMY FOR THE HAUSDORFF DIMENSION OF THE SET OF NONERGODIC DIRECTIONS
- Rational billiards and flat structures Howard Masur and Serge Tabachnikov
- GEOMETRY OF THE COMPLEX OF CURVES I: HYPERBOLICITY
- THE GEOMETRY OF THE DISK COMPLEX HOWARD MASUR AND SAUL SCHLEIMER
- ON TRAIN TRACK SPLITTING SEQUENCES HOWARD MASUR, LEE MOSHER, AND SAUL SCHLEIMER
- The Weil-Petersson Isometry Group Howard Masur* Michael Wolfy
- Superrigidity and mapping class groups Benson Farb and Howard Masur *
- Asymptotics of Weil-Petersson geodesics II: bounded geometry and unbounded entropy
- Asymptotic formulas on flat surfaces Alex Eskin* and Howard Masury
- Contemporary Mathematics Unstable quasi-geodesics in Teichm"uller space
- Teichmuller geometry of moduli space, I: Distance minimizing rays and the Deligne-Mumford
- WINNING GAMES FOR BOUNDED GEODESICS IN TEICHM ULLER DISCS
- STATISTICAL HYPERBOLICITY IN TEICHM ULLER SPACE SPENCER DOWDALL, MOON DUCHIN, AND HOWARD MASUR
- THE WEIL-PETERSSON GEODESIC FLOW IS ERGODIC K. BURNS, H. MASUR AND A. WILKINSON
