Faculty members in Pure Math Section
and their research interests

BERGERON, N. Algebraic combinatorics.
BROWN, J. M. N. Finite geometries, designs, error correcting codes, automorphism groups.
BUGAJSKA, K. Mathematical physics, string theory, relativity.
BURNS, R. G.  Combinatorial group theory, general group theory.
DENZEL, G. E. Graphical analysis.
DOW, A. Axiomatic set theory, forcing and independence, set-theoretic topology.
GAO, Y. Infinite dimensional Lie algebras,  representation theory,  homology of  algebra,  mathematical physics.
GUIASU, S.  Information theory, statistical mechanics, multivariate analysis, stochastic models in operations research.
HRUSKA, C.  Linear and nonlinear theory of continua, tensors of propagation of waves in crystals,  experimental work in piezoelectricity,   measurement methods and equipment design.
KLEINER, I. Nineteenth and early twentieth century mathematics, relations between the history and the pedagogy/teaching of mathematics.
KOCHMAN, S. O. Homology operations, cobordism theories, computer assisted computation of stable stems.
MacHENRY, T. Algebraic number theory,  multiplicative arithmetic number theory, abstract group theory.
MADRAS, N. Random walks, mathe-matical models in physics and biology, combinatorics,  Monte Carlo methods.
MULDOON, M. E. Special functions, ordinary differential equations, approximations and expansions,  functional equations.
O'BRIEN, G. L. Stationary sequences, extreme value theory, stochastic inequalities, weak and strong limit  theorems, large deviation theory.
PELLETIER, D. H. Set theory, large cardinals, infinitary combinatorics, forcing, Boolean-valued models, non-standard analysis, linear algebra, logic.
PELLETIER, J. Wick Category theory, functional analysis, applications of category theory  to analysis.
PROMISLOW, S. D. Functional analysis, group theory, actuarial mathematics.
ROGERS, P.  Mathematical education, model theory.
SALISBURY, T. Brownian motion, Markov processes.
SALOPEK, D.  Finance, real and stochastic analysis.
STEPRANS, J.  Set theory, infinitary combinatorics, forcing, applications to algebra.
THOLEN, W. Category theory and its applications to algebra, topology and theoretical computer science.
WATSON, S. Set-theoretic topology, general topology, set-theoretic combinatorics, counterexamples.
WEISS, A. Combinatorial and discrete geometry, incidence polytopes.
WHITELEY, W. Discrete geometry and its applications, rigidity (static and kinematics) of frameworks,  multivariate splines, polyhedral combinatorics, matroid theory, logic and invariant theory,  geometric reasoning.
WONG, M.W. Functional analysis, pseudo-differential operators, partial differential equations.
WU, J. Functional differential equations, nonlinear functional analysis, dynamical systems,  mathematical biology and neural networks.