# MAT: Mathematics

### MAT 511: Fundamental Concepts of Mathematics

Fundamental Concepts of Mathematics. Brief history of mathematics; sets, functions and logic; constructions of number systems; mathematical induction. The main focus of the course will be on the construction and writing of mathematical proofs.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 512: Algebra for Teachers

Linear algebra, the algebra of polynomials, algebraic properties of the complex numbers, number fields, solutions of equations.

*Prerequisite: MAT 511*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 513: Analysis for Teachers I

Topics in differential calculus, its foundations, and its applications. This course is designed for teachers and prospective teachers of advanced placement calculus.

*Prerequisite: MAT 511*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 514: Analysis for Teachers II

Topics in calculus, its foundations, and its applications. Emphasis is on integration and on numerical techniques. This course is designed for teachers and prospective teachers of advanced placement calculus. Analysis for Teachers I is not a prerequisite for this course.

*Prerequisite: MAT 511*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 515: Geometry for Teachers

A re-examination of elementary geometry using concepts from analysis and algebra.

*Prerequisite: MAT 511*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 516: Probability and Statistics for Teachers

A priori and empirical probabilities; conditional probability; mean and standard deviation; random variables; financial distributions; continuous distributions; sampling; estimation; decision making.

*Prerequisite: MAT 511*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 517: Calculators and Computers for Teachers

Calculators and Computers for teachers. Graphing calculators, programming, computing and curve sketching; Geometers Sketchpad or other computer based classroom tools; educational use of the world wide web.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 518: Seminar on the Uses of Mathematics

This seminar explores the ways in which secondary school and elementary college mathematics are used in such diverse areas as psychology, sociology, political science, economics, business, engineering, physics, chemistry, biology, and medicine. Primarily for secondary school teachers of mathematics.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 519: Seminar in Mathematics in Teaching and Learning

Seminar format. This course involves deliberative group inquiry - through reading, writing and intensive discussion - into mathematics teaching, learning and mathematics education research; analysis and design of cognitively demanding mathematical tasks; and analysis of students' mathematical thinking, written responses, and common misconceptions in the mathematics classroom. Each student completes an action research project focused on a topic selected with guidance from the instructor.

*3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 530: Topology, Geometry I

Basic point set topology; connectedness, compactness, continuity, etc. Metric spaces, function spaces, and topological manifolds. Introduction to algebraic topology; fundamental group and covering space; homology; applications.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 531: Topology, Geometry II

Foundations of differentiable manifolds: differentiable maps, vector fields and flows, and differential forms and integration on manifolds. Stokes' theorem. Froebenius theorem. Lie derivatives. Immersions and submersions. DeRham chomology, cochain complexes, degree of a map, Mayer-Vietoris Theorem.

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 534: Algebra I

Groups: normal subgroups, quotient groups, Lagrange's theorem, class formula, finite p-groups and solvable groups, Sylow's theorems, finitely generated abelian groups. Rings and modules: subrings, fields, prime and maximal ideals, quotient rings, ID's, PID's, UFD's, polynomial rings, field of fractions, the Wedderburn theorem, Hilbert basis theorem, finitely generated modules over a PID. Vector spaces: basis, linear maps and matrices, dual spaces, determinants, eigenvalues and vectors, inner products, spectral theorem for normal operators.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 535: Algebra II

Vector spaces: Cayley-Hamilton Theorem, Jordon normal form, bilinear forms, signature, tensor products, symmetric and exterior algebras. Homological algebra: categories and functors, universal and free objects, exact sequences, extensions. Representation theory for finite groups: irreducible representations and Shur's Lemma, characters, orthogonality. Galois theory: splitting fields, finite fields, extension fields of various types, Galois polynomial and group, fundamental theorem of Galois theory, symmetric functions.

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 536: Algebra III

Selections from the following topics: introductory algebraic number theory, introductory algebraic geometry, algebraic groups, cohomology of groups, homological algebra, advanced field theory and Galois theory, central simple algebras, representations of finite and compact groups.

*Prerequisite: MAT 535*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 539: Algebraic Topology

Homology and cohomology groups, homotopy groups and the Hurewicz theorem, the universal coefficient theorem, cup and cap products, Poincare duality, and introduction to spectral sequences.

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 540: Topology in Geometry and Algebra I

Cell complexes, algebraic and geometric definitions of homology, fundamental and higher homotopy groups, Hurewicz theorem, Lefschetz theorem and related topics. Prerequisites: MAT 530, MAT 531

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 541: Topology in Geometry and Algebra II

Cohomology, relations with obstruction and deformation theory, Poincare', Lefschetz, and Alexander dualities, intersection theory, relations to differential forms, monodromy and related topics. Prerequisites: MAT 530, MAT 531

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 542: Complex Analysis I

Elementary functions, holomorphic functions. Cauchy theory, power series, classification of isolated singularities, calculus of residues, open mapping theorem, Riemann mapping theorem.

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 543: Complex Analysis II

Monodromy theorem and analytic continuation. Elliptic functions. Dirichlet problem and Green's function. Conformal mappings. Introduction to Riemann surfaces and, or several complex variables.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 544: Real Analysis I

Ordinary differential equations; Banach and Hilbert spaces; inverse and implicit function theorems; Lebesque measure; general measures and integrals; measurable functions; convergence theorems for integrals.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 545: Complex Geometry

Foundational material and techniques in complex algebraic and differential geometry: Review of basic results in several complex variables/analytic geometry, sheaves and cohomology of sheaves, complex vector bundles, Chern classes, positivity, Kaehler manifolds, projective manifolds, Hodge decomposition for Kaehler manifolds, Kodaira vanishing theorem, Hard Lefschetz Theorem, divisors and line bundles, Bertini's theorem, Lefschetz theorem on (1,1) classes, blowing up, Kodaira's embedding theorem.

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 546: Differential Equations

Distributions and the Fourier transform; compact operators, Fredholm theory; pseudodifferential operators; Sobolev spaces; regularity theory for elliptic operators; Hodge theorem.

*Prerequisite: MAT 544, Corequisite: MAT 550*

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 550: Real Analysis II

Representations and decomposition theorems in measure theory; Fubini's theorem; L-p spaces; Fourier series; Laplace, heat and wave equations; open mapping and uniform boundedness theorems for Banach spaces; differentation of the integral; change of variable of integration.

*Prerequisite: MAT 544*

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 551: Real Analysis III

Selections from the following topics. Partial differential equations in higher dimensions; Sobolev spaces, calculus of variations, characteristics, Cauchy prolem, energy estimates, maximum principles, Harmonic analysis; singular integrals, Hausdorff measure, harmonic measure, Hardy spaces, Functional analysis; spectral theory, distributions, Banach algebras.

*Prerequisite: MAT 544, 550*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 552: Introduction to Lie Groups and Lie Algebras

Lie algebras Foundations of Lie groups and Lie algebras, classical groups and homogeneous spaces. Abstract Lie algebras. Basic representation theory of compact Lie groups.

*Prerequisite: MAT 531, MAT 534*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 555: Introduction to Dynamic Systems

Fundamental themes of dynamic systems and applications to other areas. Topics mey include the following: Poincare recurrence and Birkhoff Ergodic Theorem, Smale horseshow, and hyperbolicity, Geodesic flow on constant curvature surfaces, One-dimensional dynamics, Julia sets and the Mandelbrot set, Renormalization, rigidity and universality phenomena, Hamiltonian dynamics and integrability, Kolmogorov-Arnold-Moser Theory (overview), Homoclinic bifurcations and New house phenomenon. 3 credits. Offered in Spring. Prerequisites: MAT 530 and MAT 544.

*3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 560: Mathematical Physics I

Aimed at students affiliated with the RTG program, topics include: Classical field theory (Lagrangian and Hamiltonian), electromagnetism, special relativity, statistical mechanics and thermodynamics, quantum mechanics and quantum field theory.

*3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 561: Mathematical Physics II

Aimed at students affiliated with the RTG program, topics include: Classical field theory (lagrangian and Hamiltonian), electromagnetism, special relativity, statistical mechanics and thermodynamics, quantum mechanics and quantum field theory.

*3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 566: Differential Topology

Vector bundles, transversality, and characteristic classes. Further topics such as imbeddings and immersions, intersection theory, surgery, and foliations.

*Prerequisite: MAT 531*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 568: Differential Geometry

Connections, curvature, geodesics, parallelism, and completeness. Riemannian manifolds, geometry of sub-manifolds; method of integral formulas; applications to global extrinsic theorems. Riemannian curvature. Gauss-Bonnet theorem, Hopf-Rinow theorem.

*Prerequisite: MAT 531*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 569: Differential Geometry

First and second variation formulas, conjugate points and Jacobi fields, comparison theory. Curvature and fundamental group: spaces of positive and of negative curvature, space forms, Lie groups, homogeneous spaces, and symmetric spaces. Different topics may be covered depending on the choice of the instructor..

*Prerequisite: MAT 531, MAT 568*

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

### MAT 570: Concepts and Methods of Quantum Mechanics

Mathematical methods of classical mechanics: Lagrangian and Hamiltonian formulations, conservation laws. Mathematical foundation of quantum mechanics: Heisenberg and Schrodinger representations, Stone-von Neumann theorem. Examples of fundamental quantum mechanical problems, representation theory and spin. Feynman path integral formalism and related Wiener theory of integration, perturbation theory, semi-classical approximation, fermion systems. Mathematical applications.

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 588: First-Year Seminar I

Workshop on basic graduate-level mathematics skills and knowledge. Skills include reading and writing proofs, solving problems, reading mathematics. Topics cover fundamental ideas and theories such as constructions of number systems, interchange of limits, the Euclidean algorithm, and the axiom of choice.

*Fall, 3 credits, S/U grading*

### MAT 589: First-Year Seminar II

Same concept as MAT 588, but covers different materials.

*Spring, 3 credits, S/U grading*

### MAT 590: Problem Seminar

Analyze problems and explore supplementary topics related to the core courses in the Professional M.A. Option. Focus on preparation for the doctoral comprehensive examination.

*Fall and Spring, 3 credits, S/U grading*

*May be repeated for credit.*

### MAT 598: Teaching Practicum

Seminar and workshop for new teaching assistants.

*Fall, 3 credits, S/U grading*

### MAT 599: M.A. Research

*May be repeated for credit.*

### MAT 602: Topics in Algebra

Typical topics are drawn from group theory, ring theory, representation theory of groups and algebras, fields and commutative algebra, homological algebra.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 603: Topics in Algebra

Typical topics are drawn from group theory, ring theory, representation theory of groups and algebras, fields and commutative algebra, homological algebra.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 608: Topics in Number Theory

Typical topics are drawn from analytic number theory, algebraic number theory, diophantine equations, and transcendental number theory, with indications of methods from algebra, geometry, analysis, and logic.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 609: Topics in Number Theory

Typical topics are drawn from analytic number theory, algebraic number theory, diophantine equations, and transcendental number theory, with indications of methods from algebra, geometry, analysis, and logic.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 614: Topics in Algebraic Geometry

Typical topics are drawn from varieties and schemes, algebraic curves, and their arithmetics. Fall

*3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 615: Topics in Algebraic Geometry

Typical topics are drawn from varieties and schemes, algebraic curves, and their arithmetics. Fall

*3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 620: Topics in Algebraic Topology

Topics of current interest such as foliations, surgery, singularities, group actions on manifolds, and homotopy theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 621: Topics in Algebraic Topology

Topics of current interest such as foliations, surgery, singularities, group actions on manifolds, and homotopy theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 626: Topics in Complex Analysis

Topics selected from Riemann surfaces, quasiconformal mappings, several complex variables, Fuchsian groups, Kleinian groups, moduli of Riemann surfaces and Kleinian groups, analytic spaces, singularities.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 627: Topics in Complex Analysis

Topics selected from Riemann surfaces, quasiconformal mappings, several complex variables, Fuchsian groups, Kleinian groups, moduli of Riemann surfaces and Kleinian groups, analytic spaces, singularities.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 632: Topics in Differential Equations

Typical topics are hyperbolic or elliptic systems, parabolic equations, spectral theory, finite difference equations, Cauchy-Riemann equations and complex vector fields, equations with constant coefficients, solvability of linear equations, Fourier integral operators, nonlinear equations.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 633: Topics in Differential Equations

Typical topics are hyperbolic or elliptic systems, parabolic equations, spectral theory, finite difference equations, Cauchy-Riemann equations and complex vector fields, equations with constant coefficients, solvability of linear equations, Fourier integral operators, nonlinear equations.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 638: Topics in Real Analysis

Topics selected from functional analysis, harmonic analysis, Banach algebras, operator theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 639: Topics in Real Analysis

Topics selected from functional analysis, harmonic analysis, Banach algebras, operator theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 641: Topics in Lie Groups Theory

Typical topics are universal enveloping algebras; free, solvable and nilpotent Lie algebras; Lie theory and formal groups; root systems, Dynkin diagrams, classification and representations of complex semisimple Lie algebras; method of orbits; representations of non-compact Lie groups; loop groups.

*Prerequisite: MAT 552*

*Spring, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 644: Topics in Differential Geometry

Typical topics will be drawn from areas such as comparison theorems, pinching theorems, Morse theory, characteristic classes, minimal varieties, Hodge theory, spectrum of the Laplacian, and geometry of general relativity.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 645: Topics in Differential Geometry

Typical topics will be drawn from areas such as comparison theorems, pinching theorems, Morse theory, characteristic classes, minimal varieties, Hodge theory, spectrum of the Laplacian, and geometry of general relativity.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 648: Topics in Mathematical Physics

Typical topics are mathematical methods of classical and quantum mechanics; methods of functional integration and its applications; infinite-dimensional Lie algebras, quantum groups and representations; conformal field theories; super-symmetry; topological quantum field theories; gauge theories and geometry in four-dimensions; supergravity and mirror symmetry; strings.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 649: Topics in Mathematical Physics

Typical topics are mathematical methods of classical and quantum mechanics; methods of functional integration and its applications; infinite-dimensional Lie algebras, quantum groups and representations; conformal field theories; super-symmetry; topological quantum field theories; gauge theories and geometry in four-dimensions; supergravity and mirror symmetry; strings.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 655: Topics in Dynamical Systems

Typical topics are drawn from holomorphic and low-dimensional dynamics, hyperbolic dynamics, theory of Hamiltonian systems, ergodic theory, and bifurcation theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 656: Topics in Dynamical Systems

Typical topics are drawn from holomorphic and low-dimensional dynamics, hyperbolic dynamics, theory of Hamiltonian systems, ergodic theory, and bifurcation theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 662: Advanced Topics in Algebra

Prerequisite: Permission of instructor

*MAT 662 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 663: Advanced Topics in Algebra

Prerequisite: Permission of instructor

*MAT 662 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 666: Advanced Topics in Algebraic Topology

Prerequisite: Permission of instructor

*MAT 666 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 667: Advanced Topics in Algebraic Topology

Prerequisite: Permission of instructor

*MAT 666 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 670: Advanced Topics in Complex Analysis

Prerequisite: Permission of instructor

*MAT 670 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 671: Advanced Topics in Complex Analysis

Prerequisite: Permission of instructor

*MAT 670 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 674: Advanced Topics in Differential Equations

Prerequisite: Permission of instructor

*MAT 674 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 675: Advanced Topics in Differential Equations

Prerequisite: Permission of instructor

*MAT 674 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 678: Advanced Topics in Real Analysis

Prerequisite: Permission of instructor

*MAT 678 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 679: Advanced Topics in Real Analysis

Prerequisite: Permission of instructor

*MAT 678 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 682: Advanced Topics in Differential Geometry

Prerequisite: Permission of instructor

*MAT 682 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 683: Advanced Topics in Differential Geometry

Prerequisite: Permission of instructor

*MAT 682 -*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 685: Advanced Topics in Dynamics

An advanced topic selected from holomorphic and low-dimensional dynamics, hyperbolic dynamics, KAM theory, smooth ergodic theory, geodesic flows, bifurcation theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 686: Advanced Topics in Dynamics

An advanced topic selected from holomorphic and low-dimensional dynamics, hyperbolic dynamics, KAM theory, smooth ergodic theory, geodesic flows, bifurcation theory.

*Prerequisite: Permission of instructor*

*Fall, 3 credits, Letter graded (A, A-, B+, etc.)*

*May be repeated for credit.*

### MAT 690: RTG Seminar in Mathematics and Physics I

Intensive learning seminar aimed at first and second year graduate students. The main purpose is to introduce mathematics students to the methods, language and modes of thought in modern physics, and conversely to introduce physics students to the same things in modern mathematics. Student participation is required. Specific topics will change from year to year.

*1-6 credits, S/U grading*

### MAT 691: RTG Seminar in Mathematics and Physics II

Intensive learning seminar aimed at first and second year graduate students. The main purpose is to introduce mathematics students to the methods, language and modes of thought in modern physics, and conversely to introduce physics students to the same things in modern mathematics. Student participation is required. Specific topics will change from year to year.

*1-6 credits, S/U grading*

### MAT 696: Mathematics Seminar

*May be repeated for credit.*

### MAT 697: Mathematics Colloquium

*May be repeated for credit.*

### MAT 698: Independent Study

*May be repeated for credit.*

### MAT 699: Dissertation Research on Campus

Dissertation research under direction of advisor. Prerequisite: Advancement to candidacy (G5). Major portion of research must take place on SBU campus, at Cold Spring Harbor, or at the Brookhaven National Lab.

*Fall, 1-9 credits, S/U grading*

*May be repeated for credit.*

### MAT 700: Dissertation Research off Campus - Domestic

Prerequisite: Must be advanced to candidacy (G5). Major portion of research will take place off-campus, but in the United States and/or U.S. provinces. Please note, Brookhaven National Labs and the Cold Spring Harbor Lab are considered on-campus. All international students must enroll in one of the graduate student insurance plans and should be advised by an International Advisor.

*Fall, 1-9 credits, S/U grading*

*May be repeated for credit.*

### MAT 701: Dissertation Research off Campus - International

Prerequisite: Must be advanced to candidacy (G5). Major portion of research will take place outside of the United States and/or U.S. provinces. Domestic students have the option of the health plan and may also enroll in MEDEX. International students who are in their home country are not covered by mandatory health plan and must contact the Insurance Office for the insurance charge to be removed. International students who are not in their home country are charged for the mandatory health insurance. If they are to be covered by another insurance plan they must file a waiver be second week of classes. The charge will only be removed if other plan is deemed comparable.

*All international students must received clearance from an International Advisor.*

*Fall, 1-9 credits, S/U grading*

*May be repeated for credit.*

### MAT 800: FULL TIME SUMMER RES

*May be repeated for credit.*