Vladimir Arnold
| Use attributes for filter ! | |
| Gender | Male |
|---|---|
| Death | 14 years ago |
| Date of birth | June 12,1937 |
| Zodiac sign | Gemini |
| Born | Odesa |
| Ukraine | |
| Date of died | June 3,2010 |
| Died | Paris |
| France | |
| Known for | Arnold's cat map |
| ADE classification | |
| Job | Mathematician |
| Physicist | |
| Awards | Dannie Heineman Prize for Mathematical Physics |
| The Shaw Prize in Mathematical Sciences | |
| Harvey Prize in Science and Technology | |
| Lenin Prize in Science | |
| State Prize of the Russian Federation for Science and Technology | |
| Wolf Prize in Mathematics | |
| Parents | Igor Vladimirovich Arnold |
| Education | Moscow State University |
| Faculty of Mechanics and Mathematics MSU | |
| Field | Mathematics |
| Doctor advisor | Andrey Kolmogorov |
| Date of Reg. | |
| Date of Upd. | |
| ID | 543843 |
Mathematical methods of classical mechanics
Vladimir I. Arnold - Collected Works: Hydrodynamics, Bifurcation Theory, and Algebraic Geometry 1965-1972
Topological methods in hydrodynamics
Vladimir Arnold - Collected Works: Singularities in Symplectic and Contact Geometry 1980-1985
Mathematical aspects of classical and celestial mechanics
Yesterday and long ago
The Theory of Singularities and its Applications
Real Algebraic Geometry
Catastrophe theory
Huygens and Barrow, Newton and Hooke: Pioneers in Mathematical Analysis and Catastrophe Theory from Evolvents to Quasicrystals
Singularities of Differentiable Maps: Volume I: The Classification of Critical Points Caustics and Wave Fronts
Lectures and Problems: A Gift to Young Mathematicians
Vladimir Arnold – Collected Works: Singularity Theory 1972–1979
Singularities of Caustics and Wave Fronts
Ergodic problems of classical mechanics
Topological Invariants of Plane Curves and Caustics
Vladimir I. Arnold - Collected Works: Representations of Functions, Celestial Mechanics, and KAM Theory 1957-1965
Mathematical Understanding of Nature: Essays on Amazing Physical Phenomena and Their Understanding by Mathematicians
Dynamics, Statistics and Projective Geometry of Galois Fields
Experimental Mathematics
Fourteen Papers on Functional Analysis and Differential Equations
Eleven Papers on Analysis
The Arnoldfest: Proceedings of a Conference in Honour of V. I. Arnold for His Sixtieth Birthday
Seventeen Papers on Analysis
Local and global problems of singularity theory
Fifteen Papers on Analysis
Singularity Theory I
Thirteen Papers on Functional Analysis and Differential Equations
Ordinary Differential Equations
Vladimir I. Arnold - Collected Works: Hydrodynamics, Bifurcation Theory, and Algebraic Geometry 1965-1972
Topological methods in hydrodynamics
Vladimir Arnold - Collected Works: Singularities in Symplectic and Contact Geometry 1980-1985
Mathematical aspects of classical and celestial mechanics
Yesterday and long ago
The Theory of Singularities and its Applications
Real Algebraic Geometry
Catastrophe theory
Huygens and Barrow, Newton and Hooke: Pioneers in Mathematical Analysis and Catastrophe Theory from Evolvents to Quasicrystals
Singularities of Differentiable Maps: Volume I: The Classification of Critical Points Caustics and Wave Fronts
Lectures and Problems: A Gift to Young Mathematicians
Vladimir Arnold – Collected Works: Singularity Theory 1972–1979
Singularities of Caustics and Wave Fronts
Ergodic problems of classical mechanics
Topological Invariants of Plane Curves and Caustics
Vladimir I. Arnold - Collected Works: Representations of Functions, Celestial Mechanics, and KAM Theory 1957-1965
Mathematical Understanding of Nature: Essays on Amazing Physical Phenomena and Their Understanding by Mathematicians
Dynamics, Statistics and Projective Geometry of Galois Fields
Experimental Mathematics
Fourteen Papers on Functional Analysis and Differential Equations
Eleven Papers on Analysis
The Arnoldfest: Proceedings of a Conference in Honour of V. I. Arnold for His Sixtieth Birthday
Seventeen Papers on Analysis
Local and global problems of singularity theory
Fifteen Papers on Analysis
Singularity Theory I
Thirteen Papers on Functional Analysis and Differential Equations
Ordinary Differential Equations
Vladimir Arnold Life story
Vladimir Igorevich Arnold was a Soviet and Russian mathematician. While he is best known for the Kolmogorov–Arnold–Moser theorem regarding the stability of integrable systems, he made revolutionary ...
Vladimir Arnold Photos
