References
- Strelcyn , J-M . 1991 . The coexistence problem for conservative dynamical systems: a review . Colloq Math , 62 ( 2 ) : 331 – 345 .
- Cheng , C -Q and Sun , Y-S . 1989/90 . Existence of invariant tori in three dimensional measure-preserving mappings . Celestial Mech Dynam Astronom , 47 ( 3 ) : 275 – 292 . doi: 10.1007/BF00053456
- Herman , M . 1990 . Stabilité Topologique des systémes dynamiques conservatifs , Preprint
- Xia , Z . 1992 . Existence of invariant tori in volume-preserving diffeomorphisms . Ergod Th Dynam Syst , 12 : 621 – 631 . doi: 10.1017/S0143385700006969
- Yoccoz , J-C . 1992 . Travaux de Herman sur les tores invariants, Séminaire Bourbaki. 1991/92 . Astérisque , 206 : 311 – 344 . Exp. No. 754, 4
- Barreira , L and Pesin , Ya . 2007 . “ Nonuniform hyperbolicity: dynamics of systems with nonzero Lyapunov exponents ” . In Encyclopedia of Mathematics and Its Applications , Vol. 115 , xiv+513 Cambridge : Cambridge University Press .
- Pesin , Ya . 1977 . Characteristic Lyapunov exponents, and smooth ergodic theory . Russian Math Surveys , 32 : 55 – 114 . doi: 10.1070/RM1977v032n04ABEH001639
- Hu , H , Pesin , Y a and Talitskaya , A . 2013 . A volume preserving diffeomorphism with essential coexistence of zero and nonzero Lyapunov exponents . Comm Math Phys , 319 ( 2 ) : 331 – 378 . doi: 10.1007/s00220-012-1602-0
- Chen , J . 2012 . On essential coexistence of zero and nonzero Lyapunov exponents . Disc Cont Dyn Syst , 32 ( 12 ) : 4149 – 4170 . doi: 10.3934/dcds.2012.32.4149
- Przytycki , F . 1982 . Examples of conservative diffeomorphisms of the two-dimensional torus with coexistence of elliptic and stochastic behaviour . Ergod Th Dynam Syst , 2 ( 3–4 ) : 439 – 463 . 1983
- Liverani , C . 2004 . Birth of an elliptic island in a chaotic sea . Math Phys Electron J , 10 Paper 1, 13 pp. (electronic)
- Chirikov , B V . 1979 . A universal instability of many-dimensional oscillator systems . Phys Rep , 52 : 263 – 379 . doi: 10.1016/0370-1573(79)90023-1
- Froeschlé , C . 1970 . A numerical study of the stochasticity of dynamical systems with two degree of freedom . Astron Astroph , 9 : 15 – 23 .
- Angenent , S . 1990 . Monotone recurrence relations their Birkhoff orbits and topological entropy . Ergod Th Dynam Syst , 10 : 15 – 41 . doi: 10.1017/S014338570000537X
- Fontich , E . 1990 . Transversal homoclinic points of a class of conservative diffeomorphisms . J Diff Equ , 87 : 1 – 27 . doi: 10.1016/0022-0396(90)90012-E
- Gelfreich , V G . 1999 . A proof of the exponential small transversality of the separatrices for the Standard map . Commun Math Phys , 201 : 155 – 216 . doi: 10.1007/s002200050553
- Sinai , Y a . 1994 . “ Topics in ergodic theory ” . In Princeton Mathematical Series , Vol. 44 , viii+218 Princeton , NJ : Princeton University Press .
- Duarte , P . 1994 . Plenty of elliptic islands for the standard family of area preserving maps . Ann Inst H Poincaré Anal Non Lineaire , 4 ( 4 ) : 359 – 409 .
- Wojtkowski , M . 1981 . A model problem with the coexistence of stochastic and integrable behavior . Commun Math Phys , 80 : 453 – 464 . doi: 10.1007/BF01941656
- Wojtkowski , M . 1982 . On the ergodic properties of piecewise linear perturbations of the twist map . Ergod Th Dynam Syst , 2 : 525 – 542 . doi: 10.1017/S0143385700001759
- Gorodetski , A . 2012 . On stochastic sea of the standard map . Comm Math Phys , 309 ( 1 ) : 155 – 192 . doi: 10.1007/s00220-011-1365-z
- Duarte , P . 2008 . Elliptic Isles in families of area preserving maps . Ergod Th Dynam Syst , 28 : 1781 – 1813 . doi: 10.1017/S0143385707000983
- Bunimovich , L A . 2001 . Mushrooms and other billiards with divided phase space . Chaos , 11 ( 4 ) : 802 – 808 . doi: 10.1063/1.1418763
- Fayad , B . 2004 . “ Nonuniform hyperbolicity and elliptic dynamics ” . In Modern dynamical systems and applications , 325 – 330 . Cambridge : Cambridge University Press .
- Anosov , D V and Katok , A . 1970 . New examples in smooth ergodic theory . Ergodic diffeomorphisms. Trans Moscow Math Soc , 23 : 1 – 35 .
- Fayad , B and Katok , A . 2004 . Constructions in elliptic dynamics . Erg Theory Dynam Syst (Herman memorial issue) , 2004 : 1477 – 1520 . doi: 10.1017/S0143385703000798
- Donnay , V and Liverani , C . 1991 . Potentials on the two-torus for which the Hamiltonian flow is ergodic . Comm Math Phys , 135 ( 2 ) : 267 – 302 . doi: 10.1007/BF02098044
- Donnay , V . 1988 . Geodesic flow on the two-sphere. I. Positive measure entropy . Ergod Th Dynam Syst , 8 ( 4 ) : 531 – 553 . doi: 10.1017/S0143385700004685
- Chen , J , Hu , H and Pesin , Ya . 2013 . A volume preserving flow with essential coexistence of zero and nonzero Lyapunov exponents . To appear in Ergod Th Dyn Syst ,
- Burns , K and Wilkinson , A . 2010 . On the ergodicity of partially hyperbolic systems . Ann Math , 171 : 451 – 489 . doi: 10.4007/annals.2010.171.451
- Hirsch , M , Pugh , C and Shub , M . 1977 . “ Invariant manifolds ” . In Lecture Notes in Mathematics , Vol. 583 , ii+149 Berlin/New York : Springer-Verlag .
- Pugh , C and Shub , M . 1997 . Stably ergodic dynamical systems and partial hyperbolicity . J Complexity , 1997 : 125 – 179 . doi: 10.1006/jcom.1997.0437
- Burn , K , Dolgopyat , D and Pesin , Ya . 2002 . Partial hyperbolicity, Lyapunov exponents and stable ergodicity . J Stat Phys , 108 ( 5–6 ) : 927 – 942 . doi: 10.1023/A:1019779128351
- Bochi , J and Viana , M . 2005 . The Lyapunov exponents of generic volume-preserving and symplectic maps . Ann Math , 161 ( 2 ) : 1423 – 1485 . doi: 10.4007/annals.2005.161.1423
- Dolgopyat , D , Hu , H and Pesin , Ya . 1999 . “ An example of a smooth hyperbolic measure with countably many ergodic components ” . In Smooth ergodic theory and its applications Seattle Proc. Sympos. Pure Math., 69, Amer. Math. Soc. Providence, RI, 2001.
- Dolgopyat , D and Pesin , Ya . 2002 . Every compact manifold carries a completely hyperbolic diffeomorphism . Ergod Th Dynam Syst , 22 : 409 – 435 . doi: 10.1017/S0143385702000202
- Hu , H and Talitskaya , A . 2002 . A hyperbolic diffeomorphism with countably many ergodic components near identity , Preprint Available from: http://www.math.msu.edu/hhu/paper/iiif.pdf
- Shub , M and Wilkinson , A . 2000 . Pathological foliations and removable zero exponents . Invent Math , 139 ( 3 ) : 495 – 508 . doi: 10.1007/s002229900035
- Pesin , Ya . 2004 . “ Lectures on partial hyperbolicity and stable ergodicity ” . In Zürich Lectures in Advanced Mathematics , vi+122 Zürich : European Mathematical Society (EMS) .