Manfred Einsiedler

Manfred Leopold Einsiedler (6 March 1973) is an Austrian mathematician.

Manfred Einsiedler, Oberwolfach 2010

Education and career

Einsiedler studied mathematics at the University of Vienna, where he received his undergraduate degree in 1996 and his Ph.D. (promotion) in 1999 under Klaus Schmidt with thesis Problems in higher dimensional dynamics.[1] He was a postdoc in the academic year 2000–2001 at the University of East Anglia in Norwich and in the academic year 2001–2002 at Penn State University. In 2001 he earned his habilitation at the University of Vienna and then became there a professor extraordinarius (on leave). In the academic year 2004–2005 he was a visiting professor at Princeton University (as a Clay Research Scholar). At Ohio State University he became in 2006 an associate Professor and in 2008 a full professor. Since 2009 he has been a professor ordinarius at ETH Zürich.[2]

In 2004 he won the Research Prize of the Austrian Mathematical Society. In 2008 he was an invited speaker (Effective equidistribution and spectral gap) at the European Mathematical Congress in Amsterdam. In 2010 he was an invited speaker (Application of measure rigidity of diagonal actions) at the International Congress of Mathematicians in Hyderabad.

Einsiedler works on ergodic theory (especially, dynamical and equidistribution problems on homogeneous spaces) and its applications to number theory. He has collaborated with Grigory Margulis and Akshay Venkatesh. With Elon Lindenstrauss and Anatole Katok, Einsiedler proved that a conjecture of John Edensor Littlewood on diophantine approximation is "almost always" true.[3][4] ( "Almost always" means in this context that the set of pairs of real numbers for which the conjecture fails has Hausdorff measure zero.)

Selected works

References

  1. Manfred L. Einsiedler at the Mathematics Genealogy Project
  2. Einsiedler's website at ETH
  3. Einsiedler, M.; Katok, A.; Lindenstrauss, E. (2006). "Invariant measures and the set of exceptions to Littlewood's conjecture". Annals of Mathematics. 164: 513–560. MR 2247967. doi:10.4007/annals.2006.164.513.
  4. Venkatesh, Akshay (2008). "The work of Einsiedler, Katok and Lindenstrauss on the Littlewood Conjecture". Bull. Amer. Math. Soc. 45: 117–134. doi:10.1090/s0273-0979-07-01194-9.
  5. Weiss, Barak (June 2012). "Review: Ergodic theory, with a view towards number theory by Einsiedler & Ward" (PDF). Jahresber Dtsch Math-Ver. 114 (2): 113–116. doi:10.1365/s13291-012-0042-2.
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