The program provides its students with an opportunity to further
develop scholarly growth in mathematics beyond the undergraduate
experience.
The program will prepare graduates to:
Demonstrate advanced knowledge of
mathematics including
- Ability to apply Real Analysis: e.g., the theory of measure and
integration.
- Ability to apply Complex Analysis: e.g., Conformal Mapping,
Analytic Continuation.
- Ability to apply Linear Algebra: e.g., inner product spaces,
normed linear spaces.
- Ability to apply Applied Mathematics: e.g., differential
equations, probability and statistics, combinatorial analysis,
functional analysis.
Communicate mathematical concepts both
verbally and orally, with clarity and precision.
- Read and write mathematics.
- Communicate mathematical concepts both orally and in
writing.
- Create correct and detailed mathematical proofs.
Conduct research in
mathematics.
- Recognize, analyze, and formulate a problem
mathematically.
- Solve a problem and analyze and interpret its solution.
Develop mathematical maturity.
- Demonstrate recognition and application of the unity and
universal similarities of mathematical concepts.
- Apply mathematical skills in career interests or to further
study.