Difference between revisions of "Research at UW-Madison in Algebra"

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'''Tenure-track faculty in algebra'''
 
'''Tenure-track faculty in algebra'''
  
[http://pages.cs.wisc.edu/~bach/bach.html Eric Bach:] Theoretical computer science, computational number theory, algebraic algorithms, complexity theory, cryptography, six-string automata.  (Joint appointment with CS.)
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[http://pages.cs.wisc.edu/~bach/bach.html Eric Bach:] (Berkeley, 1984) Theoretical computer science, computational number theory, algebraic algorithms, complexity theory, cryptography, six-string automata.  (Joint appointment with CS.)
  
[http://www.math.wisc.edu/~boston/ Nigel Boston:] Algebraic number theory, group theory, arithmetic geometry, computational algebra, coding theory, cryptography, and other applications of algebra to electrical engineering.
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[http://www.math.wisc.edu/~boston/ Nigel Boston:] (Harvard, 1987) Algebraic number theory, group theory, arithmetic geometry, computational algebra, coding theory, cryptography, and other applications of algebra to electrical engineering.
  
[http://www.math.wisc.edu/~andreic/ Andrei Caldararu:] Algebraic geometry, homological algebra, string theory.
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[http://www.math.wisc.edu/~andreic/ Andrei Caldararu:] (Cornell, 2000) Algebraic geometry, homological algebra, string theory.
  
[http://www.math.yale.edu/~td252/ Tullia Dymarz:] (arrives Fall 2011) Geometric group theory, quasi-isometric rigidity, large scale geometry of finitely generated groups, solvable groups and quasiconformal analysis.  
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[http://www.math.yale.edu/~td252/ Tullia Dymarz:] (Chicago, 2007) (arrives Fall 2011) Geometric group theory, quasi-isometric rigidity, large scale geometry of finitely generated groups, solvable groups and quasiconformal analysis.  
  
[http://www.math.wisc.edu/~ellenber/ Jordan Ellenberg:] Arithmetic geometry and algebraic number theory, especially rational points on varieties over global fields.
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[http://www.math.wisc.edu/~ellenber/ Jordan Ellenberg:] (Harvard, 1998) Arithmetic geometry and algebraic number theory, especially rational points on varieties over global fields.
  
 
[http://www.math.ias.edu/~shamgar/ Shamgar Gurevich:] Geometric representation theory, with applications to harmonic analysis,
 
[http://www.math.ias.edu/~shamgar/ Shamgar Gurevich:] Geometric representation theory, with applications to harmonic analysis,

Revision as of 18:29, 26 July 2010

Research at UW-Madison in algebra

UW-Madison offers a large, active, and varied research group in algebra, including researchers in number theory, combinatorics, group theory, algebraic geometry, representation theory, and algebra with applications to

Tenure-track faculty in algebra

Eric Bach: (Berkeley, 1984) Theoretical computer science, computational number theory, algebraic algorithms, complexity theory, cryptography, six-string automata. (Joint appointment with CS.)

Nigel Boston: (Harvard, 1987) Algebraic number theory, group theory, arithmetic geometry, computational algebra, coding theory, cryptography, and other applications of algebra to electrical engineering.

Andrei Caldararu: (Cornell, 2000) Algebraic geometry, homological algebra, string theory.

Tullia Dymarz: (Chicago, 2007) (arrives Fall 2011) Geometric group theory, quasi-isometric rigidity, large scale geometry of finitely generated groups, solvable groups and quasiconformal analysis.

Jordan Ellenberg: (Harvard, 1998) Arithmetic geometry and algebraic number theory, especially rational points on varieties over global fields.

Shamgar Gurevich: Geometric representation theory, with applications to harmonic analysis, signal processing, mathematical physics, and three-dimensional structuring of molecules.

Martin Isaacs: Group theory, algebra.

Ken Ono: (on leave 2010-11) Combinatorics and number theory involving elliptic curves, L-functions, modular forms, Maass forms, and partitions.

Donald Passman: Ring theory, group theory, group rings and enveloping algebras of Lie algebras.

Paul Terwilliger: Combinatorics, representation theory and special functions.

Tonghai Yang: number theory, representation theory, and arithmetic geometry: especially L-functions, Eisenstein series, theta series, Shimura varieties, intersection theory, and elliptic curves.