String topology M Chas, D Sullivan arXiv preprint math/9911159, 1999 | 558* | 1999 |
Closed string operators in topology leading to Lie bialgebras and higher string algebra M Chas, D Sullivan The Legacy of Niels Henrik Abel: The Abel Bicentennial, Oslo, 2002, 771-784, 2004 | 127 | 2004 |
Combinatorial Lie bialgebras of curves on surfaces M Chas Topology 43 (3), 543-568, 2004 | 85 | 2004 |
Minimal intersection of curves on surfaces M Chas Geometriae Dedicata 144, 2007 | 41 | 2007 |
Self-intersections in combinatorial topology: statistical structure M Chas, SP Lalley Inventiones mathematicae 188 (2), 429-463, 2012 | 31 | 2012 |
An algebraic characterization of simple closed curves on surfaces with boundary M Chas, F Krongold Journal of Topology and Analysis 2 (03), 395-417, 2010 | 25 | 2010 |
The extended Goldman bracket determines intersection numbers for surfaces and orbifolds M Chas, S Gadgil Algebraic & Geometric Topology 16 (5), 2813-2838, 2016 | 23 | 2016 |
Self-intersection numbers of curves on the punctured torus M Chas, A Phillips Experimental Mathematics 19 (2), 129-148, 2010 | 17 | 2010 |
Algebraic characterization of simple closed curves via Turaev's cobracket M Chas, F Krongold Journal of Topology 9 (1), 91-104, 2016 | 14 | 2016 |
Self-intersection numbers of curves in the doubly punctured plane M Chas, A Phillips Experimental Mathematics 21 (1), 26-37, 2012 | 14 | 2012 |
On the structure of the ω-limit sets for continuous maps of the interval L Alsedà, M Chas, J Smítal International Journal of Bifurcation and Chaos 9 (09), 1719-1729, 1999 | 14 | 1999 |
The Goldman bracket and the intersection of curves on surfaces M Chas Contemporary Mathematics - Geometry, Groups and Dynamics, 639 (2015), 73-84, 2013 | 13 | 2013 |
Minimum periods of homeomorphisms of orientable surfaces M Chas arXiv preprint arXiv:1204.0023, 2012 | 11 | 2012 |
Almost simple geodesics on the triply-punctured sphere M Chas, CT McMullen, A Phillips Mathematische Zeitschrift 291, 1175-1196, 2019 | 9 | 2019 |
Crochet Topology M Chas AMS Feature Column, May, 2018 | 9 | 2018 |
Experiments suggesting that the distribution of the hyperbolic length of closed geodesics sampling by word length is Gaussian M Chas, K Li, B Maskit Experimental Mathematics 22 (4), 367-371, 2013 | 8 | 2013 |
Self-intersection numbers of length-equivalent curves on surfaces M Chas Experimental Mathematics 23 (3), 271-276, 2014 | 7 | 2014 |
Relations between Word Length, Hyperbolic Length and Self-Intersection Number of Curves on Surfaces M Chas Proceedings of the Conference of RMS-2015 - Lecture Notes Series 21, 45-75, 2015 | 6 | 2015 |
Non-abelian number theory and the structure of curves on surfaces M Chas arXiv preprint arXiv:1608.02846, 2016 | 5 | 2016 |
String topology in dimensions two and three M Chas, D Sullivan Algebraic Topology: The Abel Symposium 2007, 33-37, 2009 | 5 | 2009 |