Raoul Bott
Use attributes for filter ! | |
Gender | Male |
---|---|
Death | 19 years ago |
Date of birth | September 24,1923 |
Zodiac sign | Libra |
Born | Budapest |
Hungary | |
Date of died | December 20,2005 |
Died | San Diego |
California | |
United States | |
Nationality | American |
Hungarian | |
Job | Mathematician |
Education | Carnegie Mellon University |
McGill University | |
Awards | National Medal of Science for Mathematics and Computer Science |
Guggenheim Fellowship for Natural Sciences, US & Canada | |
Wolf Prize in Mathematics | |
Field | Mathematics |
Doctor advisor | Richard Duffin |
Notable student | Stephen Smale |
Daniel Quillen | |
Eric Weinstein | |
Date of Reg. | |
Date of Upd. | |
ID | 524063 |
Graduate Texts in Mathematics
Raoul Bott Collected Papers
Lectures on K(X)
Collected Papers: Differential operators. Vol. 2
Lectures on Algebraic and Differential Topology: Delivered at the 2. ELAM
Representation Theory of Lie Groups
Raoul Bott: Collected Papers: Volume 1: Topology and Lie Groups
Raoul Bott: Collected Papers: Volume 2: Differential Operators
The Teaching of Young Children: Some Applications of Piaget's Learning Theory
Index Theorems of Atiyah, Bott, Patodi and Curvature Invariants
Differential Forms in Algebraic Topology
Foliations
Raoul Bott Collected Papers
Lectures on K(X)
Collected Papers: Differential operators. Vol. 2
Lectures on Algebraic and Differential Topology: Delivered at the 2. ELAM
Representation Theory of Lie Groups
Raoul Bott: Collected Papers: Volume 1: Topology and Lie Groups
Raoul Bott: Collected Papers: Volume 2: Differential Operators
The Teaching of Young Children: Some Applications of Piaget's Learning Theory
Index Theorems of Atiyah, Bott, Patodi and Curvature Invariants
Differential Forms in Algebraic Topology
Foliations
Raoul Bott Life story
Raoul Bott was a Hungarian-American mathematician known for numerous foundational contributions to geometry in its broad sense. He is best known for his Bott periodicity theorem, the Morse–Bott functions which he used in this context, and the Borel–Bott–Weil theorem.