Yvette Kosmann-Schwarzbach

Yvette Kosmann-Schwarzbach (born 30 April 1941)[1] 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 University of Paris under supervision of André Lichnerowicz on a dissertation titled Dérivées de Lie des spineurs (Lie derivatives of spinors).[2] 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.[3][4]

Yvette Kosmann-Schwarzbach
Born (1941-04-30) 30 April 1941
NationalityFrench
Alma materUniversity of Paris
Known forKosmann lift
Scientific career
FieldsMathematics
InstitutionsÉcole polytechnique
University of Lille
Doctoral advisorAndré Lichnerowicz

Works
  • Groups and Symmetries: From Finite Groups to Lie Groups. Translated by Stephanie Frank Singer. Springer 2010, ISBN 978-0387788654.[5]
  • The Noether Theorems: Invariance and Conservation Laws in the Twentieth Century. Translated by Bertram Schwarzbach. Springer 2011, ISBN 978-0387878676.[6]
gollark: osmarks.tk is back up! Except the infilage.
gollark: <@319753218592866315> That's not really a good reason. It's making you jump through silly hoops to actually get control of the device.
gollark: Or some other fractal-ish thing I guess. Constantly draw more and more complex versions until either it loads or the browser implodes.
gollark: ... I actually want to make the space-filling-curve bit as a really overengineered loading spinner now.
gollark: Or make the progress bar a space-filling curve which zooms out.

References
  1. Birth date from Library of Congress and French National Library, retrieved 2019-10-13
  2. Yvette Kosmann-Schwarzbach at the Mathematics Genealogy Project
  3. Fatibene, L.; Ferraris, M.; Francaviglia, M.; Godina, M. (28 August – 1 September 1995). Janyska, J.; Kolář, I.; Slovák, J. (eds.). A geometric definition of Lie derivative for Spinor Fields. Proceedings of the 6th International Conference on Differential Geometry and Applications. Brno, Czech Republic: Masaryk University. pp. 549–558.
  4. Godina M. and Matteucci P. (2003), Reductive G-structures and Lie derivatives, Journal of Geometry and Physics, 47, pp. 66–86
  5. Reviews of Groups and Symmetries: Aloysius Helminck (2011), MR2553682; Thomas R. Hagedorn (2010), MAA Reviews.
  6. Review of The Noether Theorems: Narciso Román-Roy (2012), MR2761345; Michael Berg (2011), MAA Reviews.
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