Potential M.A. Degree Topics

Craven : Finite fields (with applications to coding theory), Computations with polynomials (Groeber bases)

Csordas : Numerical Linear Algebra, Numerical solutions of ODEs, Distribution of zeros of entire functions, Inequalities and convexity

Gotay : Symplectic geometry, geometric mechanics, geometric quantization

Little: Algebraic topology, homological algebra, tranformation groups

Mader : Integral linear algebra, Torsion-free abelian groups, Semi-direct products of groups

Myers : Mathematical Logic, Artificial Intelligence

Ortel : Potential Theory, differential topology, complex analysis

Ramsey : financial mathematics

Smith : Complex Dynamics, Function Theory on the Unit Disk

Stegenga : Wavelet Theory

Weiner : Geometry

Wilkens : Control theory, medical imaging