Ordering braids P Dehornoy, I Dynnikov, D Rolfsen, B Wiest American Mathematical Soc., 2008 | 176 | 2008 |
Why are braids orderable? P Dehornoy, I Dynnikov, D Rolfsen, B Wiest Société mathématique de France 14, xiii+ 190, 2002 | 154 | 2002 |
Arc-presentations of links: monotonic simplification I Dynnikov Fundamenta Mathematicae 1 (190), 29-76, 2006 | 129 | 2006 |
On the complexity of braids I Dynnikov, B Wiest Journal of the European Mathematical Society 9 (4), 801-840, 2007 | 89 | 2007 |
Discrete spectral symmetries of low-dimensional differential operators and difference operators on regular lattices and two-dimensional manifolds SP Novikov, IA Dynnikov Russian Mathematical Surveys 52 (5), 1057, 1997 | 89 | 1997 |
On a Yang-Baxter map and the Dehornoy ordering IA Dynnikov Russian Mathematical Surveys 57 (3), 592, 2002 | 79 | 2002 |
Geometry of plane sections of the infinite regular skew polyhedron {4, 6| 4} R DeLeo, IA Dynnikov Geometriae Dedicata 138, 51-67, 2009 | 67 | 2009 |
Semiclassical motion of the electron. A proof of the Novikov conjecture in general position and counterexamples IA Dynnikov Translations of the American Mathematical Society-Series 2 179, 45-74, 1997 | 66 | 1997 |
Geometry of the triangle equation on two-manifolds IA Dynnikov, SP Novikov arXiv preprint math-ph/0208041, 2002 | 65 | 2002 |
Bypasses for rectangular diagrams. A proof of the Jones conjecture and related questions I Dynnikov, M Prasolov Transactions of the Moscow Mathematical Society 74, 97-144, 2013 | 54 | 2013 |
The geometry of stability regions in Novikov's problem on the semiclassical motion of an electron IA Dynnikov Russian Mathematical Surveys 54 (1), 21, 1999 | 51 | 1999 |
Proof of SP Novikov's conjecture on the semiclassical motion of an electron IA Dynnikov Mathematical Notes 53, 495-501, 1993 | 44 | 1993 |
Proof of SP Novikov's conjecture for the case of small perturbations of rational magnetic fields IA Dynnikov Russian Mathematical Surveys 47 (3), 172, 1992 | 38 | 1992 |
Symmetric band complexes of thin type and chaotic sections which are not quite chaotic I Dynnikov, A Skripchenko Transactions of the Moscow Mathematical Society 76, 251-269, 2015 | 36 | 2015 |
Integrable gradient flows and Morse theory IA Dynnikov, AP Veselov arXiv preprint dg-ga/9506004, 1995 | 36* | 1995 |
Surfaces in 3-Torus: Geometry of plane sections I Dynnikov PROGRESS IN MATHEMATICS-BOSTON- 168, 162-177, 1998 | 33 | 1998 |
Topology of quasi-periodic functions on the plane IA Dynnikov, SP Novikov Russian Mathematical Surveys 60 (1), 1, 2005 | 32 | 2005 |
Interval identification systems and plane sections of 3-periodic surfaces IA Dynnikov Proceedings of the Steklov Institute of Mathematics 263 (1), 65-77, 2008 | 27 | 2008 |
On typical leaves of a measured foliated 2-complex of thin type I Dynnikov, A Skripchenko Topology, geometry, integrable systems, and mathematical physics 234, 173-199, 2014 | 26 | 2014 |
Recognition algorithms in knot theory IA Dynnikov Russian Mathematical Surveys 58 (6), 1093, 2003 | 24 | 2003 |