Terrible Ivans

ATF-10-Terrible-3dIt took most of XVI century and four Czars Ivans the Terribles, the horribles, the scares to decompose the Empire of Eurasia with the capital of Mosques (Moscow or Moscou) and help the step by step escape of Europe from ”Evil” Empire Eurasia.

 

 

 

 

 

Iván el Terrible y su hijo, por Iliá Repin.jpgThis over-dramatized and figmental Ivan the Terrible character was actually a collation of 4 (four!) Czars during the Great Strife of Russian Empire in XVI-XVII centuries invented by German historians on agenda to order of Romanov’s dynasty which won the throne Great Strife contest.

 

 

 

KremlinThe collision of dynasties of Godunov, Romanov, conspiracies of Zacharin, Kurbskiy, 3 false Dimitris as pretenders to the throne, Polish army occupying the Kremlin, truly tectonic events of orthodox religion, Great Strife and the disintegration of the Horde.

 

 

 

 

 

 

 

About the Author: Dr.Fomenko, Anatoly. Born in 1945. Full Member (Academician) of the Russian Academy of Sciences, Full Member of the Russian Academy of Natural Sciences, Full Member of the International Higher Education Academy of Sciences, Doctor of Physics and Mathematics, Professor, Head of the Moscow State University Department of Mathematics and Mechanics. Solved the classical Plateau s Problem from the theory of minimal spectral surfaces. Author of the theory of invariants and topological classification of integrable Hamiltonian dynamic systems. Laureate of the 1996 National Premium in Mathematics of the Russian Federation for a cycle of works on the Hamiltonian dynamic system multitude invariance theory. Author of 180 scientific publications, 26 monographs, and textbooks on mathematics, a specialist in geometry and topology, variational calculus, symplectic topology, Hamiltonian geometry and mechanics, computational geometry. Author of a number of books on the development of new empirical-statistical methods and their application to the analysis of historical chronicles as well as the chronology of Antiquity and the Middle Ages.

Also by Anatoly T. Fomenko

(List is non-exhaustive)

  • Differential Geometry and Topology
  • Plenum Publishing Corporation. 1987. USA, Consultants Bureau, New York, and London.
  • Variational Principles in Topology. Multidimensional Minimal Surface Theory
  • Kluwer Academic Publishers, The Netherlands, 1990.
  • Topological variational problems. – Gordon and Breach, 1991.
  • Integrability and Nonintegrability in Geometry and Mechanics
  • Kluwer Academic Publishers, The Netherlands, 1988.
  • The Plateau Problem. vols.1, 2
  • Gordon and Breach, 1990. (Studies in the Development of Modern Mathematics.)
  • Symplectic Geometry.Methods and Applications.
  • Gordon and Breach, 1988. Second edition 1995.
  • Minimal surfaces and Plateau problem. Together with Dao Chong Thi
  • USA, American Mathematical Society, 1991.
  • Integrable Systems on Lie Algebras and Symmetric Spaces. Together with V. V. Trofimov. Gordon and Breach, 1987.
  • Geometry of Minimal Surfaces in Three-Dimensional Space. Together with A. A.Tuzhilin
  • USA, American Mathematical Society. In: Translation of Mathematical Monographs. vol.93, 1991.
  • Topological Classification of Integrable Systems. Advances in Soviet Mathematics, vol. 6
  • USA, American Mathematical Society, 1991.
  • Tensor and Vector Analysis: Geometry, Mechanics and Physics. – Taylor and Francis, 1988.
  • Algorithmic and Computer Methods for Three-Manifolds. Together with S.V.Matveev
  • Kluwer Academic Publishers, The Netherlands, 1997.
  • Topological Modeling for Visualization. Together with T. L. Kunii. – Springer-Verlag, 1997.
  • Modern Geometry. Methods and Applications. Together with B. A. Dubrovin, S. P. Novikov
  • Springer-Verlag, GTM 93, Part 1, 1984; GTM 104, Part 2, 1985. Part 3, 1990, GTM 124.
  • The basic elements of differential geometry and topology. Together with S. P. Novikov
  • Kluwer Acad. Publishers, The Netherlands, 1990.
  • Integrable Hamiltonian Systems: Geometry, Topology, Classification. Together with A. V. Bolsinov
  • Taylor and Francis, 2003.
  • Empirical-Statistical Analysis of Narrative Material and its Applications to Historical Dating.
  • Vol.1: The Development of the Statistical Tools. Vol.2: The Analysis of Ancient and Medieval
  • Records. – Kluwer Academic Publishers. The Netherlands, 1994.
  • Geometrical and Statistical Methods of Analysis of Star Configurations. Dating Ptolemy’s
  • Almagest. Together with V. V Kalashnikov., G. V. Nosovsky. – CRC-Press, USA, 1993.
  • New Methods of Statistical Analysis of Historical Texts. Applications to Chronology. Antiquity in the Middle Ages. Greek and Bible History. Vols.1, 2, 3. – The Edwin Mellen Press. USA. Lewiston.
  • Queenston. Lampeter, 1999.
  • Mathematical Impressions. – American Mathematical Society, USA, 1990.

Also by Anatoly T. Fomenko

(List is non-exhaustive)

  • Differential Geometry and Topology
  • Plenum Publishing Corporation. 1987. USA, Consultants Bureau, New York, and London.
  • Variational Principles in Topology. Multidimensional Minimal Surface Theory
  • Kluwer Academic Publishers, The Netherlands, 1990.
  • Topological variational problems. – Gordon and Breach, 1991.
  • Integrability and Nonintegrability in Geometry and Mechanics
  • Kluwer Academic Publishers, The Netherlands, 1988.
  • The Plateau Problem. vols.1, 2
  • Gordon and Breach, 1990. (Studies in the Development of Modern Mathematics.)
  • Symplectic Geometry.Methods and Applications.
  • Gordon and Breach, 1988. Second edition 1995.
  • Minimal surfaces and Plateau problem. Together with Dao Chong Thi
  • USA, American Mathematical Society, 1991.
  • Integrable Systems on Lie Algebras and Symmetric Spaces. Together with V. V. Trofimov. Gordon and Breach, 1987.
  • Geometry of Minimal Surfaces in Three-Dimensional Space. Together with A. A.Tuzhilin
  • USA, American Mathematical Society. In: Translation of Mathematical Monographs. vol.93, 1991.
  • Topological Classification of Integrable Systems. Advances in Soviet Mathematics, vol. 6
  • USA, American Mathematical Society, 1991.
  • Tensor and Vector Analysis: Geometry, Mechanics and Physics. – Taylor and Francis, 1988.
  • Algorithmic and Computer Methods for Three-Manifolds. Together with S.V.Matveev
  • Kluwer Academic Publishers, The Netherlands, 1997.
  • Topological Modeling for Visualization. Together with T. L. Kunii. – Springer-Verlag, 1997.
  • Modern Geometry. Methods and Applications. Together with B. A. Dubrovin, S. P. Novikov
  • Springer-Verlag, GTM 93, Part 1, 1984; GTM 104, Part 2, 1985. Part 3, 1990, GTM 124.
  • The basic elements of differential geometry and topology. Together with S. P. Novikov
  • Kluwer Acad. Publishers, The Netherlands, 1990.
  • Integrable Hamiltonian Systems: Geometry, Topology, Classification. Together with A. V. Bolsinov
  • Taylor and Francis, 2003.
  • Empirical-Statistical Analysis of Narrative Material and its Applications to Historical Dating.
  • Vol.1: The Development of the Statistical Tools. Vol.2: The Analysis of Ancient and Medieval
  • Records. – Kluwer Academic Publishers. The Netherlands, 1994.
  • Geometrical and Statistical Methods of Analysis of Star Configurations. Dating Ptolemy’s
  • Almagest. Together with V. V Kalashnikov., G. V. Nosovsky. – CRC-Press, USA, 1993.
  • New Methods of Statistical Analysis of Historical Texts. Applications to Chronology. Antiquity in the Middle Ages. Greek and Bible History. Vols.1, 2, 3. – The Edwin Mellen Press. USA. Lewiston.
  • Queenston. Lampeter, 1999.
  • Mathematical Impressions. – American Mathematical Society, USA, 1990.