Bernd Siebert
Bernd Siebert is a German mathematician who researches in algebraic geometry.Life
Siebert studied mathematics starting 1984 at the University of Erlangen. In 1986, he changed to the University of Bonn and in 1987 to the University of Göttingen where he finished his Diplom in 1989 under the supervision of Hans Grauert with distinction. He became Grauert's PhD student and assistant in Göttingen. He received his PhD in 1992. A stay at the Courant Institute followed in 1993–94 after which we went to Bochum. In 1997–98 he spent some time at the MIT as a visiting scholar before completing his habilitation in Bochum in 1998. As a DFG-Heisenberg Fellow, he went to the Universität Paris VI/Universität Paris VII from 2000 to 2002. From there, he was called to a professorship at the Albert-Ludwigs-Universität Freiburg in 2002. He moved on to the Universität Hamburg in 2008, and in 2011, he became the head of the Graduiertenkolleg Mathematics Inspired by String Theory and QFT. In 2018, Siebert joined the faculty of the University of Texas at Austin as a professor of mathematics and holds the Sid W. Richardson Foundation Regents Chair in Mathematics #4.
In his research, Bernd Siebert contributed substantially to the theory of Gromov–Witten invariants. Around 2002 by his insights in logarithmic geometry, he entered into an ongoing joint research program with Mark Gross. This generated a sequence of relevant papers that relate to Mirror Symmetry and tropical geometry.
In 2014, jointly with Mark Gross, he became an invited speaker at the International Congress of Mathematics in Seoul for the section complex geometry. Both of them were awarded the Clay Research Award in 2016.Papers
- with M. Gross: Logarithmic Gromov-Witten invariants, J. Amer. Math. Soc. 26, 451–510.
- with M. Gross: From real affine geometry to complex geometry, Ann. of Math. 174, 1301–1428.
- with M. Gross, R. Pandharipande: The tropical vertex, Duke Math. J. 153, 297–362.
- with T. Nishinou: Toric degenerations of toric varieties and tropical curves, Duke Math. J. 135, 1–51.
- with G. Tian: On the holomorphicity of genus two Lefschetz fibrations, Annals of Mathematics 161, 955–1016.
- Symplectic Gromov-Witten invariants, in: New trends in Algebraic Geometry, Warwick 1996, Cambridge University Press 1998, 375–424.