Fall 2023 - Winter 2024 Courses
Note: The one-letter day abbreviations are M,T,W,R,F. Late afternoon classes begin at or after 4:30 pm. Evening classes begin at or after 6:00 pm. A hybrid class meets once per week online and the other time in-person. Online only classes may have in-person exams. Contact the ACM director before signing up for classes.
Fall 2023
Math 551: Advanced Calculus I
M 2:00 - 2:50 PM, TR 2:00 PM - 3:15 PM, in-person, Prof. Dabkowski
Advanced Calculus is the rigorous study of the concepts of limit, differentiation, and integration. In this course, we dig deeper into the historical developments of these concepts and deduce many principles from basic axioms. Students will practice a serious application of logic and proof techniques in the course. The basic ideas develop in this course constitute a strong foundation for any further course in mathematics. Previous experience in first-year calculus and proof methods will be helpful.
Satisfies: Core A: Analysis
Offered: Every Fall
Prerequisites: Introductory Linear Algebra class (e.g. Math 227), Differential Equations with Linear Algebra (e.g. Math 228), and Introduction to Proofs class (e.g. Math 300).
Math 504: Dynamical Systems
M (in-person), W (online) 6:00 PM - 7:15 PM, Prof. Hristova
This course will be a survey of methods, both analytic and numerical, used to study discrete time and continuous time dynamical systems. Dynamical systems are states which evolve over time and can be modeled by differential equations. This course will study these linear and nonlinear systems in one dimension and higher. It will begin with an analysis of the solutions of linear dynamical systems and the phase plane together with applications. Nonlinear systems will be studied through a variety of techniques including the Lyapunov method, LaSalle's Invariance Principle, and Poincare recurrence. There will be a particular focus on gradient flows and Hamiltonian systems. The course will conclude with a study of chaotic systems and fractal sets.
Satisfies: Modeling Specialization Area B: Differential Models
Offered: Occasionally
Prerequisites: Differential Equations with Linear Algebra (e.g. Math 228).
Math 572: Numerical Analysis
TR, 4:30 PM - 5:45 PM, in-person, Prof. Remski
Numerical Analysis is the study of algorithms that approximate solutions to many problems in mathematics. In this course, we study how computers approximate and store numbers and how round off error can affect computations. We develop and analyze algorithms to approximate solutions to mathematical problems including finding roots of functions, solving definite integrals, interpolating data by polynomials and splines, numerical differentiation, solving systems of linear equations, and solving differential equations. Some programming experience will be helpful.
Satisfies: Core B: Numerical Methods
Offered: Every Fall
Prerequisites: Introductory Linear Algebra class (e.g. Math 227), Differential Equations with Linear Algebra (e.g. Math 228).
Stat 530: Applied Regression Analysis
Section 1: TR 4:30 PM - 5:45 PM, in-person, Prof. Li
Section 2: TR 6:00 PM - 7:15 PM, in-person, Prof. Li
Topics include single variable linear regression, multiple linear regression and polynomial regression. Model checking techniques based on analysis of residuals will be emphasized. Remedies to model inadequacies such as transformations will be covered. Basic time series analysis and forecasting using moving averages and autoregressive models with prediction errors are covered. Statistical packages will be used.
Satisfies: Modeling Specialization C: Statistical Models
Offered: Every fall and winter
Prerequisites: Introductory statistics class (e.g. Stat 325, IMSE 317)