Yvette Kosmann-Schwarzbach
Yvette Kosmann-Schwarzbach | |
---|---|
Born | 30 April 1941 |
Nationality | French |
Fields | Mathematics |
Institutions |
École polytechnique University of Lille |
Alma mater | Collège de France |
Doctoral advisor | André Lichnerowicz |
Known for | Kosmann lift |
Yvette Kosmann-Schwarzbach (born 30 April 1941)[1][2] is a French mathematician and professor. She has been teaching mathematics at the Lille University of Science and Technology and at the École polytechnique since 1993. Kosmann-Schwarzbach obtained her doctoral degree in 1970 at the Collège de France under supervision of André Lichnerowicz on a dissertation titled Dérivées de Lie des spineurs (Lie derivatives of spinors).[3][4][5] She is the author of over fifty articles on differential geometry, algebra and mathematical physics, as well as the co-editor of several books concerning the theory of integrable systems. The Kosmann lift in differential geometry is named after her.[6][7]
Works
- Groups and Symmetries: From Finite Groups to Lie Groups. Springer 2010, ISBN 978-0387788654.
- The Noether Theorems: Invariance and Conservation Laws in the Twentieth Century: Invariance and Conservation Laws in the 20th Century. Translated by Bertram Schwarzbach. Springer 2011, ISBN 978-0387878676.
References
- ↑ (Yvette Kosmann-Schwarzbach) data sh. (b. 4-30-41)
- ↑ Naissance : 1941-04-30
- ↑ Docteur en mathématiques (Paris, 1970). - En poste au Centre de mathématiques, École polytechnique, Palaiseau, France (en 1993)
- ↑ Kosmann-Schwarzbach: Tribute to Andre Lichnerowicz (1915-1988). Notices of the American Mathematical Society, Vol. 56, No. 2. Accessed 30 April 2014.
- ↑ Kosmann Y. (1972), Dérivées de Lie des spineurs, Annali di Matematica Pura ed Applicata, 91 (1) pp. 317–395
- ↑ Fatibene L., Ferraris M., Francaviglia M. and Godina M. (1996), A geometric definition of Lie derivative for Spinor Fields, in: Proceedings of the 6th International Conference on Differential Geometry and Applications, August 28th–September 1st 1995 (Brno, Czech Republic), Janyska J., Kolář I. & J. Slovák J. (Eds.), Masaryk University, Brno, pp. 549–558
- ↑ Godina M. and Matteucci P. (2003), Reductive G-structures and Lie derivatives, Journal of Geometry and Physics, 47, pp. 66–86
External links
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