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College of Arts & Sciences

Graduate Mathematics Courses

  • MATH 5000 - History of Mathematics

    Main lines of mathematical development in terms of contributions made by great mathematicians: Euclid, Archimedes, Descartes, Newton, Gauss, etc..

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5070 - Introduction to Number Theory

    Investigation of properties of the natural numbers. Topics include mathematical induction, factorization, Euclidean algorithm, Diophantine equations, congruences, divisibility, multiplicative functions, and applications to cryptography.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5100 - Teaching of Mathematics in Secondary School

    Selected topics related to teaching of mathematics in grades 7-12

    Requisites: MATH 5100L or concurrent

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5100L - Teaching of Mathematics in Secondary School Early Field Experience

    Early Field Experience for students in Teaching Mathematics in Secondary Schools.

    Requisites: MATH 5100 or concurrent

    Credits: 1

    Lecture/Lab Hours: 2.0 laboratory

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5110 - College Geometry

    An axiomatic approach to Euclidean geometry. A core batch of theorems of Euclidean geometry are proven, and interesting geometric problems are solved using the axioms and theorems. Additional concepts and techniques -- such as similarity, transformations, coordinate systems, vectors, matrix representations of transformations, complex numbers, and symmetry -- are introduced as ways of simplifying the proofs of theorems or the solutions of geometric problems. Hyperbolic geometry is introduced from an axiomatic standpoint, primarily to illustrate the independence of the Parallel Postulate. Computers are used to produce dynamic drawings to illustrate theorems and problems.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5120 - College Mathematics Teaching for New Teaching Assistants

    This course prepares new mathematics teaching assistants for undergraduate-level mathematics instruction. Students will investigate the technical, pedagogical, ethical, and other professional dimensions of undergraduate mathematics instruction.

    Requisites: Permission required

    Credits: 2

    Lecture/Lab Hours: 1.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5200 - Applied Linear Algebra

    A course on linear algebra with an emphasis on applications and computations. Solutions to linear systems, matrices and matrix algebra, determinants, n-dimensional real vector spaces and subspaces, bases and dimension, eigenvalues and eigenvectors, diagonalization, norms, inner product spaces, orthogonality and least squares problems.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5210 - Linear Algebra

    A course in linear algebra for students majoring or minoring in the mathematical sciences. The course will introduce both the practical and theoretical aspects of linear algebra and students will be expected to complete both computational and proof-oriented exercises. Topic covered will include: Solutions to linear systems, matrices and matrix algebra, determinants, n-dimensional real vector spaces and subspaces, bases and dimension, linear mappings, matrices of linear mappings, eigenvalues and eigenvectors, diagonalization, inner product spaces, orthogonality and applications.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5221 - Modern Algebra I

    Groups, permutation groups, subgroups, quotient groups. Conjugate classes and class equation formula and its application to p-groups. Fundamental theorem on homomorphisms.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5222 - Modern Algebra II

    Fundamental theorem on finite abelian groups and its consequences. Cauchy theorem and first Sylow theorem. Polynomial rings. UFD and Euclidean domains. Maximal ideals. Algebraic extensions and splitting fields. Fundamental theorem of Galois theory.

    Requisites: MATH 5221

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5230 - Introduction to Algebraic Coding Theory

    Encoding and decoding. Vector spaces over finite fields. Linear Codes, parity-check matrices, syndrome decoding, Hamming Codes, and Cyclic Codes.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5301 - Advanced Calculus I

    A proof-based course on functions of one variable. Topics include properties of the real and complex numbers, metric spaces and basic topology, sequences and series, a careful study of limits and continuity, differentiation and Reimann-Stieltjes integration.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5302 - Advanced Calculus II

    Sequences and series of functions, uniform convergence, power series and elementary functions, multidimensional differentiation and integration, special functions (as time permits)

    Requisites: MATH 5301

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5310 - Complex Variables

    A first course in complex variables focused on developing analytic techniques that are useful in applications. The course is also essential for further study in mathematics and students will be expected to do some proofs. Topics will include: Analytic and harmonic functions, Cauchy integration and residue theorems, contour integration, Taylor and Laurent expansions, conformality and linear fractional transformations with applications.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5320 - Vector Analysis

    Vector algebra and its applications. Vector calculus and space curves. Scalar and vector fields, gradient, divergence, curl, and Laplacian. Line and surface integrals. Divergence theorem. Stoke's theorem, and Green's theorem.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5330 - Hilbert Spaces and Applications

    A course in applied linear analysis, especially Hilbert spaces, for advanced undegraduate and graduate students in mathematics, the sciences or engineering. The course will introduce both the practical and theoretical aspects of linear analysis and students will be expected to complete both computational and proof-oriented exercises. Topic covered will include: Normed Vector Spaces, the spaces L1 and L2, Hilbert Spaces, orthonormal systems, linear operators on Hilbert space and applications to differential equations.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5400 - Advanced Differential Equations

    An introduction to the qualitative theory of differential equations, with emphesis on linear systems.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5410 - Fourier Analysis and Partial Differential Equations

    Representation of functions as sums of infinite series of trigonometric functions and complex exponentials,, Bessel functions, Legendre polynomials, or other sets of orthogonal functions. Use of such representations for solution of partial differential equations dealing with vibrations, heat flow, and other physical problems.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5470 - Applied Dynamical Systems

    A survey of applied dynamical systems for Scientists, Engineers and Mathematicians with an emphasis on continuous time models.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5500 - Theory of Statistics

    Probability distributions of one and several variables, sampling theory, estimation of parameters, confidence intervals, analysis of variance, correlation, and testing of statistical hypotheses.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5510 - Applied Statistics

    Applications of the theory of statistics, including hypotheses testing, regression and correlation analysis, experimental design, and nonparametric statistics.

    Requisites: MATH 5500

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5520 - Stochastic Processes

    Markov chains, Poisson process, birth and death process, queuing, and related topics.

    Requisites: MATH 5500

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5530 - Statistical Computing

    Introduction to computational statistics; Monte Carlo methods, bootstrap, data partitioning methods, EM algorithm, probability density estimation, Markov Chain Monte Carlo methods.

    Requisites: MATH 5500

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5550 - Basic Principles of Actuarial Science

    Basic concepts of risk theory and utility theory, applied calculus and probability models for the analysis of claims, frequency and severity of distributions, loss distributions, premium determination, insurance with deductible, reinsurance and self-insurance.

    Requisites: MATH 5500 or concurrent

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5560 - Theory of Interest and Life Contingencies

    Theory of interest and contingent payment models. Mathematical models for the actuarial present value of a future set of payments contingent on some random event(s); life insurance, life annuities, benefit reserves.

    Requisites: MATH 5550

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5600 - Introduction to Numerical Analysis

    A survey of the ideas, methods, and algorithms in Numerical Analysis.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5610 - Introduction to Waves and Wavelets with Applications

    An elementary introduction to Fourier and wavelet analysis and its applications in engineering, such as data analysis and signal and image analysis. Focus on understanding basic mathematical concepts and methodology, developing related numerical algorithms and their implementation using computer software such as Matlab wavelet toolbox. Prior experience with computer software and computer algebra systems, such as Matlab and basic computer programming skills are required.

    Requisites: MATH 5600

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5620 - Linear and Nonlinear Optimization

    Solution methods, theory and applications of linear and nonlinear optimization problems. The focus is on the mathematics of efficient optimization algorithms, such as Simplex method and steepest ascent. Applications include production planning, financial models, network problems, game theory.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5630 - Discrete Modeling and Optimization

    Modeling and solving real-life problems by discrete optimization techniques. The discrete models include integer programming, dynamic programming, network optimization problems. Applications in large economic systems, scheduling, voting theory, telecom and transportation networks are discussed.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5680 - Quantitative Foundations for Bioinformatics

    Bioinformatics is the science of extracting biologically relevant information from large sets of biomolecular data. The course will introduce students to the mathematical models, statistical techniques, and algorithms on which this process is based.

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5700 - Introduction to Topology

    Topology of Euclidean spaces and general metric spaces. Introduction to general topological spaces.

    Requisites: MATH 5301

    Credits: 3

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 5900 - Special Topics in Mathematics

    Specific course content will vary with offering.

    Credits: 1 - 15

    Lecture/Lab Hours: 1.0 lecture

    Eligible Grades: A-F,CR,PR,WP,WF,WN,FN,AU,I

  • MATH 5910 - Internship

    Internship at an employer outside the university.

    Credits: 1

    Lecture/Lab Hours: 1.0 field experience/internship

    Eligible Grades: F,CR,PR,WP,WF,WN,FN,AU,I

  • MATH 5960 - Seminar

    Seminar

    Credits: 1 - 4

    Lecture/Lab Hours: 1.0 seminar

    Eligible Grades: F,CR,WP,WF,WN,FN,AU,I

  • MATH 6221 - Algebra I

    G-sets. Orbits and stabilizers. Orbit decomposition formula. Permutation groups. Alternating groups. Simple groups. Composition series. Jordan-Holder Theorem. The Sylow Theorems. Fundamental theorem of abelian groups. Solvable and nilpotent groups. Rings of power series and Laurent series. Division rings. Prime and maximal ideals in a ring (not necessarily commutative). Nil radical. Rings of quotients of domains (not necessarily commutative). Artinian and Noetherian rings and modules. Hilbert Basis Theorem. Completely reducible modules. Semi-simple Artinian rings. Free, projective, and divisible modules. Tensor product of modules and algebras. Polynomial rings. Irreducible polynomials. Quotient rings. Eisenstein Criterion. Algebraic extension. Algebraically closed fields. Splitting fields. Normal and separable extensions. Finite fields. Fixed fields. Fundamental Theorem of Galois Theory. Solvability by radicals. Constructability by ruler and compass.

    Requisites: MATH 5222

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6222 - Algebra II

    Continuation of Algebra I.

    Requisites: MATH 6221

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6231 - Coding Theory I

    A mathematically rigorous survey of Error-Correcting Codes with emphasis on their parameters and their algorithmic efficiency for coding and decoding. Reed Solomon Codes, Goppa Codes, Reed Muller Codes, Algebraic Geometry Codes. Coding and Decoding based on Fast Fourier Transform algorithms. This course surveys various approaches to the structure theory of convolutional codes. They are considered as vector spaces over fields of Laurent expansions, as modules over rings of polynomials and as graph codes. All necessary algebraic background beyond linear algebra is presented in the class, including concepts related to modules over principal ideal domains and ideas regarding trellises and other relevant types of graphs.

    Requisites: MATH 5230

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6232 - Coding Theory II

    This course surveys various approaches to the structure theory of convolutional codes. They are considered as vector spaces over fields of Laurent expansions, as modules over rings of polynomials and as graph codes. All necessary algebraic background beyond linear algebra is presented in the class, including concepts related to modules over principal ideal domains and ideas regarding trellises and other relevant types of graphs. The course also addresses topics on algebraic coding theory over ring alphabets.

    Requisites: MATH 6231

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6301 - Analysis I

    Abstract measure and integration, Lebesgue measure on real line; Lp-spaces; Fubini and Radon-Nikodym theorems; differentiation theory.

    Requisites: MATH 5302 or 5700

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6302 - Analysis II

    Continuation of Analysis I.

    Requisites: MATH 6301

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6310 - Complex Analysis

    A graduate course in complex analysis focused on classical results for analytic and harmonic functions. Many of the techniques explained in the course, e.g. integrals along paths and the residue theorem, are useful in applications. Topics will include: Analytic and harmonic functions, Cauchy's theorem and Cauchy's integral formula, classification of singularities, and entire functions.

    Requisites: MATH 5302 or 5310

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6320 - Functional Analysis

    An introduction to the basic results of functional analysis in the setting of Banach and Hilbert spaces. Key topics include the weak and weak* topologies, distributions, and an introduction to the Spectral Theorem. Theorems covered include the Hahn-Banach theorem, the Principle of Uniform Boundedness, the Closed Graph theorem, and the Open Mapping Theorem.

    Requisites: MATH 6301 and (MATH 5330 or 6302)

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6330 - Fourier Analysis

    A graduate course in Fourier Analysis focused on classical results for Fourier series and Fourier transforms. Standard techniques explained in the course, e.g. representations of functions by Fourier series, forward and inverse Fourier transforms, are useful in applications. Topics will include: Fourier series on [-pi,pi], Bessel inequality, convergence theorems, the Fourier transform, and the inverse Fourier transform.

    Requisites: MATH 6301

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6400 - Ordinary Differential Equations

    A rigorous, proof based course on ordinary differential equations and systems.

    Requisites: MATH 5400 and (MATH 5302 or 5330)

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6411 - Partial Differential Equations I

    Classical methods in partial differential equations. First-order PDEs, Laplace's equation, the wave and heat equations, second-order elliptic, parabolic and hyperbolic equations, maximum principles.

    Requisites: (MATH 5302 or 5330) and 5400 and 5410

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6412 - Partial Differential Equations II

    Advanced functional analytic methods in partial differential equations

    Requisites: MATH 6411

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6420 - Calculus of Variations and Optimal Control

    A basic course in calculus of variations and optimal control of systems governed by differential equations.

    Requisites: MATH 5302 and 5400

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6470 - Dynamical Systems

    An advanced course in dynamical systems with an emphasis on canonical examples and mathematical theory.

    Requisites: MATH 5400 or 5470

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6500 - Mathematical Statistics

    Different types of convergence, consistency, sufficiency and completeness of estimators, theory of hypotheses testing, asymptotic theory.

    Requisites: MATH 5510 and 5302

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6510 - Linear Models

    Simple linear and multiple regression models, one-sample and one-factor analysis of variance, analysis of residuals, generalized linear models, analysis of deviance as a generalization of the analysis of variance.

    Requisites: MATH 5510

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6520 - Experimental Design

    Randomization, blocking, Latin squares, balanced incomplete block designs, factorial experiments, confounding and fractional replication, components of variance, orthogonal polynomials, response surface methods.

    Requisites: MATH 5510

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6530 - Time Series Analysis

    Introductory examples and models, autocorrelation, stationary processes, ARMA models, spectral analysis, nonstationary time series, state-space models, further topics and applications.

    Requisites: MATH 5510 and 5302

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6640 - Numerical Analysis: Linear Algebra

    In-depth analysis of numerical aspects of problems and algorithms in linear algebra.

    Requisites: MATH 5600

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6650 - Numerical Analysis: Approximation Methods

    In-depth treatment of numerical approximation techniques, including differentiation and integration.

    Requisites: MATH 5600

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6660 - Numerical Analysis: Differential Equations

    In-depth treatment of numerical methods for ordinary differential equations; introduction to methods for partial differential equations.

    Requisites: MATH 5400 and 5600

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6700 - Point Set Topology

    General topological spaces, product and quotient spaces, convergence, separation, countability properties, compactness and paracompactness, connectivity, metric spaces, completion, metrization, completely regular spaces, uniform spaces.

    Requisites: MATH 5302 or 5700

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6710 - Algebraic Topology

    The fundamental group and the van Kampen theorem, homology of complexes, exact sequences, polyhedra and CW-complexes, simplicial and singular homology and cohomology, applications to Euclidean spaces (the Jordan theorem, the Brouwer fixed point theorem, topological invariance of open sets), covering spaces, fibrations and cofibrations, higher homotopy groups, manifolds and Poincare duality, characteristic classes of vector bundles, introduction to K-theory.

    Requisites: MATH 6700

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6750 - Set Theory

    Introduction to axiomatic set theory; ordinals and cardinals; equivalents of axiom of choice. Introduction to combinatorial set theory.

    Credits: 4

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6900 - Special Topics in Mathematics

    Specific course content will vary with offering.

    Credits: 1 - 15

    Lecture/Lab Hours: 1.0 lecture

    Eligible Grades: A-F,CR,PR,WP,WF,WN,FN,AU,I

  • MATH 6930 - Independent Study

    Independent study of topics under guidance of faculty member. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 independent study

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 6940 - Project in Computational Mathematics

    Students complete an individual project such as design, implementation, testing, or analysis of an algorithm.

    Requisites: MATH 5600

    Credits: 4

    Lecture/Lab Hours: 3.0 research

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6942 - Project in Mathematics Education Research

    Students complete an individual project such as designing and conducting a small pilot study and writing a report detailing the importance of the research question, its place in extant literature, framework and methods, results, and implications.

    Credits: 4

    Lecture/Lab Hours: 3.0 research

    Eligible Grades: A-F,WP,WF,WN,FN,AU,I

  • MATH 6950 - Thesis

    Master level Thesis. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 thesis/dissertation

    Eligible Grades: F,CR,PR,WP,WF,WN,FN,AU,I

  • MATH 7000 - Topics in the Foundation and History of Mathematics

    Selected topics not offered in normal course offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7010 - Topics in Number Theory

    Selected topics not offered in normal course offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7100 - Topics in the Teaching of Mathematics

    Selected topics not covered in regular course offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7150 - Topics in Geometry

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7200 - Topics in Algebra

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7300 - Topics in Analysis

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7400 - Topics in Differential Equations

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7500 - Topics in Probability, Statistics, and Stochastic Processes

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7600 - Topics in Applied Mathematics

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 7700 - Topics in Topology

    Selected topics not covered in regular offerings. May be repeated for credit.

    Credits: 1 - 10

    Lecture/Lab Hours: 3.0 lecture

    Eligible Grades: A-F,CR,WP,WF,WN,FN,AU,I

  • MATH 8900 - Special Topics in Mathematics

    Specific course content will vary with offering.

    Credits: 1 - 15

    Lecture/Lab Hours: 1.0 lecture

    Eligible Grades: A-F,CR,PR,WP,WF,WN,FN,AU,I

  • MATH 8960 - Seminar

    Seminar. May be repeated for credit.

    Credits: 1

    Lecture/Lab Hours: 1.0 seminar

    Eligible Grades: F,CR,WP,WF,WN,FN,AU,I

  • MATH 8950 - Dissertation

    Doctoral dissertation research. May be repeated for credit.

    Credits: 1 - 15

    Lecture/Lab Hours: 3.0 thesis/dissertation

    Eligible Grades: F,CR,PR,WP,WF,WN,FN,AU,I

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