Algebra

Research in algebra at ÍÃ×ÓÏÈÉú´«Ã½ÎÄ»¯×÷Æ· is centered around Lie theory and algebraic combinatorics, algebraic geometry and general algebra.

The principal topics of research in Lie Theory and algebraic combinatorics involve finite structures —Coxeter groups, diagram algebras, groups of Lie type— as well as infinite dimensional ones —infinite dimensional Lie algebras, vertex algebra theory, and graded combinatorial Hopf algebras.

The focus in algebraic geometry is on moduli of curves, Picard groups, abelian varieties, logarithmic geometry, deformation theory.

In general algebra we study general algebraic structures, commutator theory, tame congruence theory, clone theory, the combinatorics of ordered sets and computational problems in algebra.

Seminars

Faculty

Sebastian Casalaina-Martinalgebraic geometry
Richard Greenalgebraic combinatorics, representation theory
Keith Kearnesalgebra, logic, combinatorics
Peter Mayralgebra, computational complexity
Flor Orosz HunzikerLie theory, representation theory, vertex algebras
Nat Thiemalgebraic combinatorics, representation theory
Jonathan Wisealgebraic geometry

Postdoctoral Researchers

Charlotte Atenalgebra, category theory, combinatorics
Spencer Daughertyalgebra, combinatorics
Juan VillarrealLie theory, geometry

Emeriti