• Christopher Hanusa: algebraic and enumerative combinatorics, graph theory, integer sequences, applications to the social sciences
• Steven Kahan: number theory, recreational mathematics
• Krzysztof Klosin: algebraic number theory, Galois representations, automorphic forms, special L-values, modularity
• Kenneth Kramer: algebraic number theory and arithmetic geometry
• Alexey Ovchinnikov: differential algebra, symbolic computation
• Maria Sabitova: arithmetic geometry, representation theory, algebraic number theory
• John Terilla: operads, deformation theory, quantum field theory, algebraic topology
• Scott Wilson: topology and geometry, applications to physics

Analysis, Real and Complex

• Jozef Dodziuk: relations between analysis, topology, and geometry for manifolds, cell complexes and graphs
• Wallace Goldberg: analysis, applied mathematics, differential equations, mathematical biology
• Yunping Jiang: low-dimensional dynamical systems, quasiconformal mappings and Teichmuller theory and Riemann surfaces, thermodynamical formalism and dynamical zeta functions, smooth dynamical systems and ergodic theory
• Sudeb Mitra: complex analysis, Teichmuller spaces.
• Stefan Ralescu: decision theory, admissibility, minimaxity, Stein estimation, nonparametric inference, asymptotic approximations in statistics, empirical and quantile pocesses.
• Dragomir Saric: complex analysis, differential and Riemannian geometry, dynamical systems, mathematical physics, topology
• Norman Weiss: real, harmonic and functional analysis
• Saeed Zakeri: dynamical systems, complex analysis, quasiconformal mappings

Applied Mathematics

• Wallace Goldberg: analysis, applied mathematics, differential equations, mathematical biology
• Stefan Ralescu: decision theory, admissibility, minimaxity, Stein estimation, nonparametric inference, asymptotic approximations in statistics, empirical and quantile pocesses.
• Fern Sisser: non-linear programming, optimization

Combinatorics

• Christopher Hanusa: algebraic and enumerative combinatorics, graph theory, integer sequences, applications to the social sciences
• Joseph Kahane: combinatorics, combinatorial games, mathematical physics

Dynamical Systems

• Yunping Jiang: low-dimensional dynamical systems, quasiconformal mappings and Teichmuller theory and Riemann surfaces, thermodynamical formalism and dynamical zeta functions, smooth dynamical systems and ergodic Theory
• Michael Maller: computational complexity and dynamical systems
• Dragomir Saric: complex analysis, differential and Riemannian geometry, dynamical systems, mathematical physics, topology
• Saeed Zakeri: dynamical systems, complex analysis, quasiconformal mappings

Geometry and Topology

• Jozef Dodziuk: relations between analysis, topology, and geometry for manifolds, cell complexes and graphs
• Dan Lee: differential and Riemannian geometry, general relativity
• Dragomir Saric: complex analysis, differential and Riemannian geometry, dynamical systems, mathematical physics, topology
• John Terilla: operads, deformation theory, quantum field theory, algebraic topology
• Scott Wilson: topology and geometry, applications to physics

Logic, Computability and Complexity

• Russell Miller: computability theory and its applications to model theory and algebra
• Michael Maller: computational complexity and dynamical systems
• Alexey Ovchinnikov: differential algebra, symbolic computation

Mathematics Education

• Alan Sultan

Mathematical Physics

• Joseph Kahane: combinatorics, combinatorial games, mathematical physics
• Dan Lee: differential and Riemannian geometry, general relativity
• Dragomir Saric: complex analysis, differential and Riemannian geometry, dynamical systems, mathematical physics, topology
• John Terilla: operads, deformation theory, quantum field theory, algebraic topology
• Scott Wilson: topology and geometry, applications to physics