Martin Schlichenmaier
Born(1952-10-09)October 9, 1952
Backnang Germany
Alma materUniversity of Karlsruhe, Germany
Occupationmathematician
Websitemath.uni.lu/schlichenmaier/

Martin Schlichenmaier is a German - Luxembourgish mathematician whose research deals with algebraic, geometric and analytic mathematical methods which partly have relations to theoretical and mathematical physics.

Life and work

In 1990 Schlichenmaier earned a doctoral degree.[1] in mathematics at the University of Mannheim with Rainer Weissauer with the thesis Verallgemeinerte Krichever - Novikov Algebren und deren Darstellungen.[2] His research topics are, beside other fields , the geometric foundations of quantisation, e.g. Berezin-Toeplitz-Quantisierung and infinite dimensional Lie algebras of geometric origin, like the algebras of Krichever- Novikov type. [3]

From 1986 until 2003 he worked at the University of Mannheim. In the year 1996 he habilitated with the thesis Zwei Anwendungen algebraisch-geometrischer Methoden in der theoretischen Physik: Berezin-Toeplitz-Quantisierung und globale Algebren der zweidimensionalen konformen Feldtheorie [4]

Since 2003 he has been professor at the University of Luxemburg,[5] recently as Emeritus . From 2005 until 2017 he was director of the Mathematical Research Unit, Department of Mathematics [6] at the University of Luxemburg. He is a member of the editorial boards of the mathematical journals Journal of Lie Theory,[7] and Analysis and Mathematical Physics[8]

He is president of the Luxembourgish Mathematical Society, SML.[9] He received the Grand Prix 2016 en sciences mathematiques de L'Institut Grand-Ducal -prix de la Bourse de Luxembourg.[10] 2019 he was appointed as full member of the Institut Grand-Ducal, Section des Sciences[11]

Selected publications

Books:

  • Schlichenmaier, Martin (2014), Krichever-Novikov Type Algebras. Theory and Applications, Studies in Mathematics, vol. 53, Berlin/Boston: de Gruyter, doi:10.1515/9783110279641, ISBN 978-3-11-026517-0.
  • Schlichenmaier, Martin (2007), An Introduction to Riemann Surfaces, Algebraic Curves and Moduli Spaces, 2nd enlarged edition, Theoretical and Mathematical Physics, Berlin/Heidelberg: Springer, doi:10.1007/978-3-540-71175-9, ISBN 978-3-540-71174-2.

Articles:

References

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