Annette Huber-klawitter
Mathematics
Freiburg Institute for Advanced Studies
Germany
Biography
Annette Huber-Klawitter works in number theory, ie, on questions about the properties of the integers. It follows the very modern and successful approach of arithmetic geometry: equations are seen as describing geometric objects, which are then studied by methods of algebraic geometry. Prof. Huber-Klawitter works in particular on motives (a conjectural universal cohomology theory), periods and special values ​​of L-functions. As a high school student she was a three time winner of the Federal Competition Mathematics. She then studied mathematics and physics in Frankfurt, Cambridge and Münster. In 1994 she obtained a doctorate from the University of Münster in mathematics under the supervision of Christopher Deninger. After her habilitation in 1999, at Münster, she was appointed full professor at the University of Leipzig. She moved to Freiburg in 2008. Since 2012 she leads the Graduate Program Cohomolgical Methods in Algebraic Geometry. In 2002, she was invited to the ICM in Beijing. In 2008 she was a member of the German Academy of Natural Scientists Leopoldina and in 2012 Fellow of the AMS.
Research Interest
Her current research focuses on Cohomological Methods in Algebraic Geometry and Representation Theory
Publications
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A. Huber, G. Kings. Equivariant Bloch-Kato conjecture and non-abelian Iwasawa Main Conjecture. Proceedings of the ICM, Beijing, 2002, vol. II, pp. 149-162. Higher Education Press, Beijing, 2002.
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A. Huber, C.J., Differential forms in the h-topology, (pdf) Algebraic Geometry, Volume 1, Issue 4 (October 2014), 449-478.
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A. Huber, S. Mueller-Stach, with contributions from Benjamin Friedrich and Jonas von Wangenheim, Periods and Nori motives, Springer Verlag, Results of Mathematics and its Border Regions, Volume 65, 2017.
