September 13, 2018
3:00PM - 4:00PM
Math Building 317
Add to Calendar
2018-09-13 15:00:00
2018-09-13 16:00:00
Geometry, Combinatorics and Integrable Systems Seminar - McCabe Olsen
Title: Ehrhart Theory and Lecture Hall Partitions
Speaker: McCabe Olsen (Ohio State University)
Abstract: Ehrhart theory is the study of lattice point enumeration in convex rational polyhedra. In this talk, we will provide a brief overview of some concepts, definitions, and properties of interest in Ehrhart theory. We will then discuss results on polytopes arising from lecture hall partitions, which are a particularly rich and interesting family of combinatorial objects.
Seminar URL: https://research.math.osu.edu/gcis/
Math Building 317
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2018-09-13 15:00:00
2018-09-13 16:00:00
Geometry, Combinatorics and Integrable Systems Seminar - McCabe Olsen
Title: Ehrhart Theory and Lecture Hall Partitions
Speaker: McCabe Olsen (Ohio State University)
Abstract: Ehrhart theory is the study of lattice point enumeration in convex rational polyhedra. In this talk, we will provide a brief overview of some concepts, definitions, and properties of interest in Ehrhart theory. We will then discuss results on polytopes arising from lecture hall partitions, which are a particularly rich and interesting family of combinatorial objects.
Seminar URL: https://research.math.osu.edu/gcis/
Math Building 317
Department of Mathematics
math@osu.edu
America/New_York
public
Title: Ehrhart Theory and Lecture Hall Partitions
Speaker: McCabe Olsen (Ohio State University)
Abstract: Ehrhart theory is the study of lattice point enumeration in convex rational polyhedra. In this talk, we will provide a brief overview of some concepts, definitions, and properties of interest in Ehrhart theory. We will then discuss results on polytopes arising from lecture hall partitions, which are a particularly rich and interesting family of combinatorial objects.
Seminar URL: https://research.math.osu.edu/gcis/