82 University Pl
Innovation Hall E444
Burlington, VT 05405
United States
- PhD, Mathematics - Harvard University
- BA, Mathematics - Princeton University
Department of Mathematics and Statistics
BIO
Greg graduated from Princeton University in 1995 with a BA in Mathematics. Following a year as a computer-game programmer in California, he earned his PhD in Mathematics from Harvard University in 2001 under the supervision of Sara Billey. He was a postdoc at the University of Massachusetts at Amherst and an NSF postdoc at the University of Pennsylvania. After a several years in a tenure-track position at Wake Forest University in North Carolina, he returned to the northeast in 2009 to start at UVM.
Greg is an algebraic combinatorialist: He is interested in understanding the combinatorial scaffolding that underlies rich structures in algebra and geometry. Much of his work relates to the symmetric group of permutations (i.e., orderings), one of the most fundamental objects in mathematics. He is intrigued by simple mathematical problems that arise naturally. This has led to published work on the mathematics of juggling and of the game Memory. In recent years he has been drawn into the mathematics of gerrymandering. His research has been supported by the National Science Foundation, the National Security Agency and the Simons Foundation.
Courses
MATH 2248 - Calculus III
MATH 2544 - Linear Algebra
MATH 2551 - Groups and Rings
MATH 2678 - Basic Combinatorial Theory
MATH 3551 - Abstract Algebra I
MATH 5678 - Graph Theory
MATH 3990 - Differential Geometry
MATH 6678 - Topics in Combinatorics
Publications
Area(s) of expertise
Algebraic Combinatorics, Mathematics of Gerrymandering.
Bio
Greg graduated from Princeton University in 1995 with a BA in Mathematics. Following a year as a computer-game programmer in California, he earned his PhD in Mathematics from Harvard University in 2001 under the supervision of Sara Billey. He was a postdoc at the University of Massachusetts at Amherst and an NSF postdoc at the University of Pennsylvania. After a several years in a tenure-track position at Wake Forest University in North Carolina, he returned to the northeast in 2009 to start at UVM.
Greg is an algebraic combinatorialist: He is interested in understanding the combinatorial scaffolding that underlies rich structures in algebra and geometry. Much of his work relates to the symmetric group of permutations (i.e., orderings), one of the most fundamental objects in mathematics. He is intrigued by simple mathematical problems that arise naturally. This has led to published work on the mathematics of juggling and of the game Memory. In recent years he has been drawn into the mathematics of gerrymandering. His research has been supported by the National Science Foundation, the National Security Agency and the Simons Foundation.
Courses
MATH 2248 - Calculus III
MATH 2544 - Linear Algebra
MATH 2551 - Groups and Rings
MATH 2678 - Basic Combinatorial Theory
MATH 3551 - Abstract Algebra I
MATH 5678 - Graph Theory
MATH 3990 - Differential Geometry
MATH 6678 - Topics in Combinatorics
Publications
Areas of Expertise
Algebraic Combinatorics, Mathematics of Gerrymandering.