Biography:Jürg Peter Buser

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Short description: Swiss mathematician

Jürg Peter Buser, known as Peter Buser, (born 27 February 1946 in Basel) is a Swiss mathematician, specializing in differential geometry and global analysis.

Education and career

Buser received his doctorate in 1976 from the University of Basel with advisor Heinz Huber and thesis Untersuchungen über den ersten Eigenwert des Laplaceoperators auf kompakten Flächen (Studies on the first eigenvalue of the Laplace operator on compact surfaces).[1] As a post-doctoral student he was at the University of Bonn, the University of Minnesota. and the State University of New York at Stony Brook, before he habilitated at the University of Bonn with a thesis on the length spectrum of Riemann surfaces.

Buser is known for his construction of curved isospectral surfaces (published in 1986 and 1988). His 1988 construction led to a negative solution to Mark Kac's famous 1966 problem Can one hear the shape of a drum?. The negative solution was published in 1992 by Scott Wolpert, David Webb and Carolyn S. Gordon.[2][3] The Cheeger-Buser inequality (de) is named after him and Jeff Cheeger.

He has been a professor at the École Polytechnique Fédérale de Lausanne (EPFL) since 1982. From 2004 to 2005 he was president of the Swiss Mathematical Society. In 2003 he was made an honorary doctor of the University of Helsinki.

Selected publications

References

  1. Jürg Peter Buser at the Mathematics Genealogy Project
  2. Gordon, Carolyn; Webb, David L.; Wolpert, Scott (1992). "One Cannot Hear the Shape of a Drum". Bulletin of the American Mathematical Society 27 (1): 134–139. doi:10.1090/S0273-0979-1992-00289-6. ISSN 0273-0979. 
  3. Barry Cipra: You can't always hear the shape of a drum , in What´s happening in the Mathematical Sciences , volume 1, American Mathematical Society 1993, p. 15
  4. Patterson, S. J. (1994). "Book Review: Geometry and spectra of compact Riemann surfaces". Bulletin of the American Mathematical Society 30 (1): 143–145. doi:10.1090/S0273-0979-1994-00448-3. ISSN 0273-0979. 
  5. Berg, Michael (13 May 2011). "Review of Geometry and Spectra of Compact Riemann Surfaces". https://www.maa.org/press/maa-reviews/geometry-and-spectra-of-compact-riemann-surfaces. 

External links