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Zhuzhoma Evgenii Viktorovich

Publications in Math-Net.Ru

  1. On expanding attractors of arbitrary codimension

    CMFD, 70:3 (2024),  389–402
  2. Underlying manifolds of high-dimensional Morse–Smale diffeomorphisms with saddles of codimension 1

    Mat. Zametki, 116:5 (2024),  814–818
  3. Hyperbolic Attractors Which are Anosov Tori

    Regul. Chaotic Dyn., 29:2 (2024),  369–375
  4. Classification of Axiom A Diffeomorphisms with Orientable Codimension One Expanding Attractors and Contracting Repellers

    Regul. Chaotic Dyn., 29:1 (2024),  143–155
  5. On a Classification of Chaotic Laminations which are Nontrivial Basic Sets of Axiom A Flows

    Rus. J. Nonlin. Dyn., 19:2 (2023),  227–237
  6. Smale Regular and Chaotic A-Homeomorphisms and A-Diffeomorphisms

    Regul. Chaotic Dyn., 28:2 (2023),  131–147
  7. Chaotic Laminations and Their Properties

    Mat. Zametki, 112:1 (2022),  138–142
  8. Many-Dimensional Morse–Smale Diffeomeophisms with a Dominant Saddle

    Mat. Zametki, 111:6 (2022),  835–845
  9. On the Topological Structure of Manifolds Supporting Axiom A Systems

    Regul. Chaotic Dyn., 27:6 (2022),  613–628
  10. Underlying Manifolds of High-Dimensional Morse–Smale Diffeomorphisms with Two Saddle Periodic Points

    Mat. Zametki, 109:3 (2021),  361–369
  11. Cantor Type Basic Sets of Surface $A$-endomorphisms

    Rus. J. Nonlin. Dyn., 17:3 (2021),  335–345
  12. On $DA$-endomorphisms of the two-dimensional torus

    Mat. Sb., 212:5 (2021),  102–132
  13. Necessary and sufficient conditions for the conjugacy of Smale regular homeomorphisms

    Mat. Sb., 212:1 (2021),  63–77
  14. Polar Morse-Smale systems with two saddles on $n$-sphere

    Taurida Journal of Computer Science Theory and Mathematics, 2021, no. 4,  40–51
  15. On Two-Dimensional Expanding Attractors of A-Flows

    Mat. Zametki, 107:5 (2020),  787–790
  16. On local structure of one-dimensional basic sets of non-reversible A-endomorphisms of surfaces

    Zhurnal SVMO, 22:4 (2020),  424–433
  17. Classification of Morse–Smale systems and topological structure of the underlying manifolds

    Uspekhi Mat. Nauk, 74:1(445) (2019),  41–116
  18. On the compliance of the basic sets of A-endomorphisms and A-diffeomorphisms

    Chelyab. Fiz.-Mat. Zh., 3:3 (2018),  295–310
  19. On topology of manifolds admitting a gradient-like flow with a prescribed non-wandering set

    Mat. Tr., 21:2 (2018),  163–180
  20. Conjugacy of Morse–Smale Diffeomorphisms with Three Nonwandering Points

    Mat. Zametki, 104:5 (2018),  775–780
  21. Many-dimensional solenoid invariant saddle-type sets

    Zhurnal SVMO, 20:1 (2018),  23–29
  22. Dynamical systems and topology of magnetic fields in conducting medium

    CMFD, 63:3 (2017),  455–474
  23. Saddle-Type Solenoidal Basis Sets

    Mat. Zametki, 101:6 (2017),  843–853
  24. On the topological structure of the magnetic field of regions of the photosphere

    Nelin. Dinam., 13:3 (2017),  399–412
  25. Nondissipativ kinematic dynamics on lenses

    Zhurnal SVMO, 19:2 (2017),  53–61
  26. Conjugacy of Smale-Vietoris diffeomorphisms using a conjugacy of endomorphisms

    Zhurnal SVMO, 19:1 (2017),  38–50
  27. On the structure of the ambient manifold for Morse–Smale systems without heteroclinic intersections

    Trudy Mat. Inst. Steklova, 297 (2017),  201–210
  28. Morse–Smale systems and topological structure of supporting manifolds

    CMFD, 61 (2016),  5–40
  29. Continuous Morse-Smale flows with three equilibrium positions

    Mat. Sb., 207:5 (2016),  69–92
  30. On the existence of periodic orbits for continuous Morse-Smale flows

    Zhurnal SVMO, 18:1 (2016),  12–16
  31. Rough diffeomorphisms with basic sets of codimension one

    CMFD, 57 (2015),  5–30
  32. Alternative methods for spiral wave chaos control and suppressing in cardiac models

    Izvestiya VUZ. Applied Nonlinear Dynamics, 23:4 (2015),  40–57
  33. On semiconjugacy of Williams endomorphism and nonsingular circle endomorphism

    Zhurnal SVMO, 17:4 (2015),  24–30
  34. Continuous Morse-Smale flows on projective-like manifolds

    Zhurnal SVMO, 17:1 (2015),  55–64
  35. Heteroclinic curves of Morse–Smale cascades and separators in magnetic field of plasma

    Nelin. Dinam., 10:4 (2014),  427–438
  36. Solenoidal basic sets of Smale-Vietoris А-diffeomorphisms

    Zhurnal SVMO, 16:2 (2014),  63–68
  37. On existence of magnetic lines joining zero points

    Zhurnal SVMO, 16:1 (2014),  8–15
  38. Solenoidal basic sets of Smale-Vietoris А-diffeomorphisms

    Zhurnal SVMO, 15:4 (2013),  125–135
  39. On existence of separators of magnetic fields in a spherical layer of plasma

    Zhurnal SVMO, 15:3 (2013),  21–28
  40. A model of fast kinematic dynamo

    Zhurnal SVMO, 15:2 (2013),  23–26
  41. The destruction of the Smale-Williams solenoids

    Zhurnal SVMO, 15:1 (2013),  65–70
  42. Closing lemmas

    Differential Equations and Control Processes, 2012, no. 1,  1–84
  43. Morse–Smale Diffeomorphisms with Three Fixed Points

    Mat. Zametki, 92:4 (2012),  541–558
  44. Equivalence of Morse-Smale flows on 4-manifolds

    Zhurnal SVMO, 14:4 (2012),  7–13
  45. On interior dynamics of Smale-Vietoris diffeomorphisms

    Zhurnal SVMO, 14:3 (2012),  52–58
  46. On the inner and the neighbor classification of the attractors

    Zhurnal SVMO, 14:2 (2012),  57–66
  47. Classification of coverings of the circle

    Trudy Mat. Inst. Steklova, 278 (2012),  96–101
  48. Zero-dimensional solenoidal base sets

    Mat. Sb., 202:3 (2011),  47–68
  49. On bifurcation in models of hyperbolic noise

    Zhurnal SVMO, 13:4 (2011),  51–60
  50. On the Morse-Smale diffeomorphisms with three fixed points

    Zhurnal SVMO, 13:3 (2011),  40–46
  51. The dynamics of $SV$-diffeomorphisms on basic solid torus

    Zhurnal SVMO, 12:1 (2010),  59–66
  52. Global attractor and repeller of Morse–Smale diffeomorphisms

    Trudy Mat. Inst. Steklova, 271 (2010),  111–133
  53. Gradient flows with wildly embedded closures of separatrices

    Trudy Mat. Inst. Steklova, 270 (2010),  138–146
  54. Classification of One-Dimensional Expanding Attractors

    Mat. Zametki, 86:3 (2009),  360–370
  55. Surface Basic Sets with Wildly Embedded Supporting Surfaces

    Mat. Zametki, 85:3 (2009),  356–372
  56. Сarrier manifolds of Smale-Vietoris diffeomorphisms

    Trudy SVMO, 11:1 (2009),  71–77
  57. On Foliations Defined by Harmonic Functions

    Mat. Zametki, 84:1 (2008),  132–135
  58. On some problem of Kaplan

    Trudy SVMO, 10:2 (2008),  88–91
  59. On embedding of surface basic sets

    Trudy SVMO, 10:1 (2008),  147–158
  60. Global Dynamics of Morse–Smale Systems

    Trudy Mat. Inst. Steklova, 261 (2008),  115–139
  61. Expanding attractors

    Regul. Chaotic Dyn., 11:2 (2006),  225–246
  62. Closed cross-sections of irrational flows on surfaces

    Mat. Sb., 197:2 (2006),  35–56
  63. On Surface Attractors and Repellers in 3-Manifolds

    Mat. Zametki, 78:6 (2005),  813–826
  64. Continuous Dependence of Geodesic Frames in the Hausdorff Metric

    Mat. Zametki, 77:6 (2005),  935–937
  65. Nonlocal asymptotic behavior of curves and leaves of laminations on universal coverings

    Trudy Mat. Inst. Steklova, 249 (2005),  3–239
  66. Nonlocal Properties of Analytic Flows on Closed Orientable Surfaces

    Trudy Mat. Inst. Steklova, 244 (2004),  6–22
  67. On Typical Diffeotopy of Rough Diffeomorphisms with Expanding Attractor of Codimension One

    Mat. Zametki, 74:3 (2003),  478–480
  68. On Morse–Smale Diffeomorphisms with Four Periodic Points on Closed Orientable Manifolds

    Mat. Zametki, 74:3 (2003),  369–386
  69. New relations for Morse–Smale systems with trivially embedded one-dimensional separatrices

    Mat. Sb., 194:7 (2003),  25–56
  70. Structurally stable diffeomorphisms with basis sets of codimension one

    Izv. RAN. Ser. Mat., 66:2 (2002),  3–66
  71. On asymptotic directions of semitrajectories of analytic flows on surfaces

    Uspekhi Mat. Nauk, 57:6(348) (2002),  169–170
  72. On non-orientable two-dimensional basic sets on 3-manifolds

    Mat. Sb., 193:6 (2002),  83–104
  73. Asymptotic Behavior of Covering Curves on the Universal Coverings of Surfaces

    Trudy Mat. Inst. Steklova, 238 (2002),  5–54
  74. The Closure Lemma for Piecewise Diffeomorphic Maps of the Circle

    Mat. Zametki, 69:2 (2001),  310–313
  75. Two-dimensional basic sets of structurally stable diffeomorphisms of three-dimensional manifolds

    Uspekhi Mat. Nauk, 56:3(339) (2001),  153–154
  76. Properties of the Absolute That Affect Smoothness of Flows on Closed Surfaces

    Mat. Zametki, 68:6 (2000),  819–829
  77. Two-dimensional basic sets of structurally stable diffeomorphisms of three-dimensional manifolds

    Uspekhi Mat. Nauk, 55:6(336) (2000),  123–124
  78. Transitive and supertransitive flows on closed nonorientable surfaces

    Mat. Zametki, 63:4 (1998),  625–628
  79. Strengthening the $C^r$-closing lemma for dynamical systems and foliations on the torus

    Mat. Zametki, 61:3 (1997),  323–331
  80. On continuity of geodesic frameworks of flows on surfaces

    Mat. Sb., 188:7 (1997),  3–22
  81. Classification of Cherry transformations on a circle and of Cherry flows on a torus

    Izv. Vyssh. Uchebn. Zaved. Mat., 1996, no. 4,  7–17
  82. On the geometry and topology of flows and foliations on surfaces and the Anosov problem

    Mat. Sb., 186:8 (1995),  25–66
  83. Cherry flows on a two-dimensional sphere

    Uspekhi Mat. Nauk, 49:5(299) (1994),  167–168
  84. On the structure of quasiminimal sets of foliations on surfaces

    Mat. Sb., 185:8 (1994),  31–62
  85. Quasiminimal sets of foliations, and one-dimensional basic sets of $A$-diffeomorphisms of surfaces

    Dokl. Akad. Nauk, 330:3 (1993),  280–281
  86. Local structure and smoothness on a torus that obstructs quasiminimalities

    Differ. Uravn., 29:6 (1993),  923–926
  87. Trajectories covering flows for branched coverings of the sphere and projective plane

    Mat. Zametki, 53:5 (1993),  3–13
  88. On the $C^r$-closing lemma on surfaces

    Uspekhi Mat. Nauk, 43:5(263) (1988),  173–174
  89. The relation between topological and smooth properties of transformations of a circle without periodic points and with a finite number of critical points

    Izv. Vyssh. Uchebn. Zaved. Mat., 1985, no. 8,  64–67
  90. Orientable basic sets of codimension 1

    Izv. Vyssh. Uchebn. Zaved. Mat., 1982, no. 5,  16–21
  91. A topological classification of foliations described by one-dimensional Pfaffian forms on an $n$-dimensional torus

    Differ. Uravn., 17:8 (1981),  1385–1393
  92. Singular Reeb foliations on the $n$-dimensional torus

    Mat. Zametki, 30:1 (1981),  123–127
  93. The topological classification of orientable attractors on an $n$-dimensional torus

    Uspekhi Mat. Nauk, 34:4(208) (1979),  185–186
  94. The topological classification of singular dynamical systems on the torus

    Izv. Vyssh. Uchebn. Zaved. Mat., 1976, no. 5,  104–107

  95. Anatolii Mikhailovich Stepin (obituary)

    Uspekhi Mat. Nauk, 77:2(464) (2022),  189–194
  96. To the 75th anniversary of Vyacheslav Zigmundovich Grines

    Zhurnal SVMO, 23:4 (2021),  472–476
  97. Вячеслав Зигмундович Гринес (к семидесятилетию со дня рождения)

    Zhurnal SVMO, 18:4 (2016),  168–171
  98. Dmitrii Viktorovich Anosov (obituary)

    Uspekhi Mat. Nauk, 70:2(422) (2015),  181–191
  99. Romen Vasil'evich Plykin (obituary)

    Uspekhi Mat. Nauk, 66:3(399) (2011),  199–202


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