A survey of contemporary topics in mathematics such as: voting systems and power, apportionment, fair division of divisible and indivisible assets, efficient distribution, scheduling and routing, ...

Mathematical modeling is the process of developing mathematical descriptions, or models, of real-world systems. These models can be linear or nonlinear, discrete or continuous, deterministic or ...

Mathematics is one of the oldest disciplines of study. For all its antiquity, however, it is a modern, rapidly growing field. Only 70 years ago, mathematics might have been said to consist of algebra, ...

The ability to analyse, interpret and evaluate data is integral to student success. Therefore, this course is designed to develop students the knowledge, skills and confidence to apply mathematical ...

On this page you will find the listing of graduate course descriptions (selected). Also see course listings for current semester. Office of the Registrar: Register for Classes Please note: Course ...

Discover patterns and universal truths. Apply logic and problem-solving to real-world problems with a mathematics degree. Scholar athlete Tommy Kawamura BA '14 turned his love of baseball into a ...

Students focus on engineering problem solving. They learn the design process, with an emphasis on graphics and documentation. A student’s mathematics placement is determined by the Department of ...

This will be an introduction to functional analysis and some of its applications. In a nutshell, we'll investigate the properties of continuous linear mappings of infinite-dimensional vector spaces.

Students can’t succeed in math if they’re never exposed to it. And many students never get access to advanced—or even some foundational—math in high school. New federal civil rights data and an ...