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Author:   Vladimir I. Arnold ,  Boris A. Khesin ,  Mikhail B. Sevryuk ,  Victor A. Vassiliev
Publisher:   Springer International Publishing AG
Imprint:   Springer International Publishing AG
ISBN:  

9783031773976

ISBN 10:   3031773977
Pages:   540
Publication Date:   26 January 2026
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   In Print  
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Table of Contents

1 The Sturm theorems and symplectic geometry.- 2 First steps of symplectic topology.- 3 First steps of symplectic topology.- 4 On some problems in symplectic topology.- 5 Contact structure, relaxation oscillations and singular points of implicit differential equations.- 6 Contact geometry and wave propagation.- 7 Contact geometry: the geometrical method of Gibbs’s thermodynamics.- 8 Hyperbolic polynomials and Vandermonde mappings.- 9 On surfaces defined by hyperbolic equations.- 10 On the interior scattering of waves, defined by hyperbolic variational principles.- 11 The ramified covering CP^2 → S^4, hyperbolicity, and projective topology.- 12 Quasicrystals, Penrose tilings, Markov partitions, stochastic web, and singularity theory.- 13 Remarks on quasicrystallic symmetries.- 14 Dynamics of complexity of intersections.- 15 Dynamics of intersections.- 16 Cardiac arrhythmias and circle mappings.- 17 Remarks on Poisson structures on the plane and on other powers of volume forms.- 18 Convex hulls and increasing the output of systems under a pulsating load.- 19 Spaces of functions with moderate singularities.- 20 𝐴-graded algebras and continued fractions.- 21 Topological and ergodic properties of closed 1-forms with incommensurable periods.- 22 Bifurcations and singularities in mathematics and mechanics.- 23 Singularities and bifurcations of potential flows.- 24 Singularities of the boundaries of spaces of differential equations.- 25 Some unsolved problems of the theory of differential equations and mathematical physics.- 26 Ten problems.- 27 Evolution processes and ordinary differential equations.- 28 The tercentennial of mathematical natural sciences and celestial mechanics.- 29 Kepler’s second law and the topology of Abelian integrals (according to Newton).- 30 The topological proof of transcendence of Abelian integrals in Newton’s “Mathematical Principles of Natural Philosophy”.- 31 Newton’s Principia read 300 years later.- 32 Meanders.- 33 A mathematical trivium.- 33a Comments on “A mathematical trivium” by V. Arnold.- 34 A mathematical trivium II.- 35 The catastrophe theory and new opportunities for application of mathematics.- 36 Catastrophe theory.- 37 Catastrophe theory.- 38 Conversation with Vladimir Igorevich Arnold (an interview with S. Zdravkovska).- 39 Arnold in his own words (an interview with S.L. Tabachnikov).- 40 Mathematics in the work of Ya.B. Zeldovich.- 41 YaB and mathematics.- 42 Remembering A.N. Kolmogorov.- 43 A few words on Andrei Nikolaevich Kolmogorov.- 44 A.N. Kolmogorov.- 45 On A.N. Kolmogorov.- 46 Look for talents!.- 47 Mathematics with a human face.- 48 Encyclopaedia of Mathematical Sciences, or mathematics with a human face.- 49 Preface to the Russian translation of the book by P.A. Griffiths “Exterior Differential Systems and the Calculus of Variations”.- 50 Preface to the Russian translation (in the form of a book) of the article by P. Scott “The geometries of 3-manifolds”.- 51 Preface to the Russian translation of the book by J.W. Bruce and P.J. Giblin “Curves and Singularities. A Geometrical Introduction to Singularity Theory”.- Acknowledgements.

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Author Information

Vladimir Arnold was one of the great mathematical scientists of our time. He is famous for both the breadth and the depth of his work. At the same time he is one of the most prolific and outstanding mathematical authors.  

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