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Volume III of the Collected Works of V.I. Arnold contains papers
written in the years 1972 to 1979. The main theme emerging in
Arnold's work of this period is the development of singularity
theory of smooth functions and mappings. The volume also contains
papers by V.I. Arnold on catastrophe theory and on A.N.
Kolmogorov's school, his prefaces to Russian editions of several
books related to singularity theory, V. Arnold's lectures on
bifurcations of discrete dynamical systems, as well as a review by
V.I. Arnold and Ya.B. Zeldovich of V.V. Beletsky's book on
celestial mechanics. 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.
Volume III of the Collected Works of V.I. Arnold contains papers
written in the years 1972 to 1979. The main theme emerging in
Arnold's work of this period is the development of singularity
theory of smooth functions and mappings. The volume also contains
papers by V.I. Arnold on catastrophe theory and on A.N.
Kolmogorov's school, his prefaces to Russian editions of several
books related to singularity theory, V. Arnold's lectures on
bifurcations of discrete dynamical systems, as well as a review by
V.I. Arnold and Ya.B. Zeldovich of V.V. Beletsky's book on
celestial mechanics. 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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Vladimir I. Arnold - Collected Works - Representations of Functions, Celestial Mechanics, and KAM Theory 1957-1965 (English, Russian, Paperback, 2010 ed.)
Vladimir I. Arnold; Edited by Alexander B. Givental, Boris Khesin, Jerrold E. Marsden, Alexander N. Varchenko, …
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R5,335
Discovery Miles 53 350
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Ships in 10 - 15 working days
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Vladimir Igorevich Arnold is one of the most influential
mathematicians of our time. V. I. Arnold launched several
mathematical domains (such as modern geometric mechanics,
symplectic topology, and topological fluid dynamics) and
contributed, in a fundamental way, to the foundations and methods
in many subjects, from ordinary differential equations and
celestial mechanics to singularity theory and real algebraic
geometry. Even a quick look at a partial list of notions named
after Arnold already gives an overview of the variety of such
theories and domains: KAM (Kolmogorov-Arnold-Moser) theory, The
Arnold conjectures in symplectic topology, The Hilbert-Arnold
problem for the number of zeros of abelian integrals, Arnold's
inequality, comparison, and complexification method in real
algebraic geometry, Arnold-Kolmogorov solution of Hilbert's 13th
problem, Arnold's spectral sequence in singularity theory, Arnold
diffusion, The Euler-Poincare-Arnold equations for geodesics on Lie
groups, Arnold's stability criterion in hydrodynamics, ABC
(Arnold-Beltrami-Childress) ?ows in ?uid dynamics, The
Arnold-Korkina dynamo, Arnold's cat map, The Arnold-Liouville
theorem in integrable systems, Arnold's continued fractions,
Arnold's interpretation of the Maslov index, Arnold's relation in
cohomology of braid groups, Arnold tongues in bifurcation theory,
The Jordan-Arnold normal forms for families of matrices, The Arnold
invariants of plane curves. Arnold wrote some 700 papers, and many
books, including 10 university textbooks. He is known for his lucid
writing style, which combines mathematical rigour with physical and
geometric intuition. Arnold's books on
Ordinarydifferentialequations and Mathematical
methodsofclassicalmechanics became mathematical bestsellers and
integral parts of the mathematical education of students throughout
the world."
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Vladimir I. Arnold - Collected Works - Representations of Functions, Celestial Mechanics, and KAM Theory 1957-1965 (English, Russian, Hardcover, 2010 ed.)
Vladimir I. Arnold; Edited by Alexander B. Givental, Boris Khesin, Jerrold E. Marsden, Alexander N. Varchenko, …
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R5,373
Discovery Miles 53 730
|
Ships in 10 - 15 working days
|
Vladimir Igorevich Arnold is one of the most influential
mathematicians of our time. V. I. Arnold launched several
mathematical domains (such as modern geometric mechanics,
symplectic topology, and topological fluid dynamics) and
contributed, in a fundamental way, to the foundations and methods
in many subjects, from ordinary differential equations and
celestial mechanics to singularity theory and real algebraic
geometry. Even a quick look at a partial list of notions named
after Arnold already gives an overview of the variety of such
theories and domains: KAM (Kolmogorov-Arnold-Moser) theory, The
Arnold conjectures in symplectic topology, The Hilbert-Arnold
problem for the number of zeros of abelian integrals, Arnold's
inequality, comparison, and complexification method in real
algebraic geometry, Arnold-Kolmogorov solution of Hilbert's 13th
problem, Arnold's spectral sequence in singularity theory, Arnold
diffusion, The Euler-Poincare-Arnold equations for geodesics on Lie
groups, Arnold's stability criterion in hydrodynamics, ABC
(Arnold-Beltrami-Childress) ?ows in ?uid dynamics, The
Arnold-Korkina dynamo, Arnold's cat map, The Arnold-Liouville
theorem in integrable systems, Arnold's continued fractions,
Arnold's interpretation of the Maslov index, Arnold's relation in
cohomology of braid groups, Arnold tongues in bifurcation theory,
The Jordan-Arnold normal forms for families of matrices, The Arnold
invariants of plane curves. Arnold wrote some 700 papers, and many
books, including 10 university textbooks. He is known for his lucid
writing style, which combines mathematical rigour with physical and
geometric intuition. Arnold's books on
Ordinarydifferentialequations and Mathematical
methodsofclassicalmechanics became mathematical bestsellers and
integral parts of the mathematical education of students throughout
the world.
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