Mathematics Graduate Programs
The master's program in Mathematics is structured as follows:
- MAT 533 Real Analysis I (3 credits),
- MAT 535 Algebra I (3 credits),
- MAT 523 Differential Equations I (3 credits),
- 4 courses to be selected from among graduate courses (12 credits),
- MAT 597 Seminar (no credit)
- MAT 599 Dissertation (no credit)
- Master's Thesis
- FBE 600 Scientific Research Techniques and Publication Ethics (no credit - must)
List of Master's Courses:
|
Course Code |
Course Title |
Credits |
|
MAT 501 |
Introduction to Difference Equations I |
3 Credits |
|
MAT 502 |
Introduction to Difference Equations II |
3 Credits |
|
MAT 503 |
Introduction to Optimal Control Theory I |
3 Credits |
|
MAT 504 |
Introduction to Optimal Control Theory II |
3 Credits |
|
MAT 505 |
Mathematics of Finance I |
3 Credits |
|
MAT 506 |
Mathematics of Finance II |
3 Credits |
|
MAT 507 |
Complex Dynamics and Newton Method |
3 Credits |
|
MAT 508 |
Normal Families |
3 Credits |
|
MAT 509 |
Partial Differential Equations I |
3 Credits |
|
MAT 510 |
Partial Differential Equations II |
3 Credits |
|
MAT 511 |
Numerical Solutions to Partial Differential Equations I |
3 Credits |
|
MAT 512 |
Numerical Solutions to Partial Differential Equations II |
3 Credits |
|
MAT 513 |
Linear Difference Equations and Stability Theory I |
3 Credits |
|
MAT 514 |
Linear Difference Equations and Stability Theory II |
3 Credits |
|
MAT 515 |
Cryptology I |
3 Credits |
|
MAT 516 |
Cryptology II |
3 Credits |
|
MAT 517 |
Coding Theory I |
3 Credits |
|
MAT 518 |
Coding Theory II |
3 Credits |
|
MAT 519 |
Approximation Properties of Linear Positive Operators I |
3 Credits |
|
MAT 520 |
Approximation Properties of Linear Positive Operators II |
3 Credits |
|
MAT 521 |
Numerical Analysis I |
3 Credits |
|
MAT 522 |
Numerical Analysis II |
3 Credits |
|
MAT 523 |
Differential Equations I |
3 Credits |
|
MAT 524 |
Differential Equations II |
3 Credits |
|
MAT 525 |
Applied Mathematics I |
3 Credits |
|
MAT 526 |
Applied Mathematics II |
3 Credits |
|
MAT 527 |
Topology I |
3 Credits |
|
MAT 528 |
Topology II |
3 Credits |
|
MAT 529 |
Functional Analysis I |
3 Credits |
|
MAT 530 |
Functional Analysis II |
3 Credits |
|
MAT 531 |
Spectral Analysis of Differential Operators I |
3 Credits |
|
MAT 532 |
Spectral Analysis of Differential Operators II |
3 Credits |
|
MAT 533 |
Real Analysis I |
3 Credits |
|
MAT 534 |
Real Analysis II |
3 Credits |
|
MAT 535 |
Algebra I |
3 Credits |
|
MAT 536 |
Algebra II |
3 Credits |
|
MAT 537 |
Functions Theory I |
3 Credits |
|
MAT 538 |
Functions Theory II |
3 Credits |
|
MAT 539 |
Differential Geometry I |
3 Credits |
|
MAT 540 |
Differential Geometry II |
3 Credits |
|
MAT 541 |
Complex Analysis I |
3 Credits |
|
MAT 542 |
Complex Analysis II |
3 Credits |
|
MAT 543 |
Summability Theory I |
3 Credits |
|
MAT 544 |
Summability Theory II |
3 Credits |
|
MAT 545 |
Selected Topics in Analysis |
3 Credits |
|
MAT 550 |
Fuzzy Differential Equations |
3 Credits |
|
MAT 551 |
Mathematical Biology |
3 Credits |
|
MAT 555 |
Selected Topics in Differential Equations |
3 Credits |
|
MAT 556 |
Probability Theory I |
3 Credits |
|
MAT 557 |
Probability Theory II |
3 Credits |
|
MAT 558 |
Mathematical Statistics I |
3 Credits |
|
MAT 559 |
Mathematical Statistics II |
3 Credits |
|
MAT 560 |
Selected Topics in Applied Mathematics |
3 Credits |
|
MAT 561 |
Differentiable Manifolds |
3 Credits |
|
MAT 562 |
Differential Topology |
3 Credits |
|
MAT 563 |
Variational Analysis |
3 Credits |
|
MAT 564 |
Elliptical Curves |
3 Credits |
|
MAT 565 |
Selected Topics in Topology and Geometry |
3 Credits |
|
MAT 566 |
Combinetorial Mathematics I |
3 Credits |
|
MAT 567 |
Combinetorial Mathematics II |
3 Credits |
|
MAT 568 |
Numbers Theory |
3 Credits |
|
MAT 569 |
Modular Functions |
3 Credits |
|
MAT 570 |
Advanced Linear Algebra |
3 Credits |
|
MAT 571 |
Reductive Sequences |
3 Credits |
|
MAT 572 |
Finite Objects |
3 Credits |
|
MAT 573 |
Finite Groups |
3 Credits |
|
MAT 574 |
Selected Topics in Algebra |
3 Credits |
|
MAT 597 |
Seminar |
3 Credits |
|
MAT 599 |
Master's Thesis |
3 Credits |
- FBE 600 Scientific Research Techniques and Publication Ethics (no credit - must)
Ph.D. Programs in Mathematics:
- Analysis and Functions Theory
- Algebra and its Applications
- Applied Mathematics
are the three areas where Ph.D. in Mathematics are awarded. For students who already hold a master's degree, the Ph.D. program is composed of at least 7 courses (21 credits), the qualification exam, and the Ph.D. thesis. Students who study for a Ph.D. in Analysis and Functions Theory, Algebra and its Applications, or Applied Mathematics should take at least two courses from outside their areas. The area a selected course pertains to shall be subject to the decision of the department chair, on the basis of the relevant advisor’s recommendation.
The list of courses in the Ph.D. in Mathematics program:
|
Course Code |
Course Title |
Credits |
|
MAT 641 |
Functional Analysis I |
3 Credits |
|
MAT 651 Applied Mathematics |
||
|
MAT 642 |
Functional Analysis II |
3 Credits |
|
Compact linear operators defined in norm spaces, and their spectrums; spectral theory of limited self-adjoint linear operators; positive operators; projection operators; spectral family; spectral theory of unlimited linear operators in Hilbert space. |
||
|
MAT 643 |
Approximation Theory I |
3 Credits |
|
Function spaces; positive linear operators; Korovkin-type approximation theories for algebraic and trigonometric cases; miscellaneous applications; continuity module; approximation rates. |
||
|
MAT 644 |
Approximation Theory II |
3 Credits |
|
Latest developments in Korovkin theory; statistical approximation; statistical approximation rates; Korovkin theorems in fuzzy logic theory; miscellaneous applications; approximation to functions using various non-positive linear operators. |
||
|
MAT 645 |
Topological Vector Spaces I |
3 Credits |
|
A course offered to allow the students get specialized in any of the special topics and theories of Classical Analysis. |
||
|
MAT 646 |
Topological Vector Spaces II |
3 Credits |
|
MAT 647 |
Selected Topics in Analysis |
3 Credits |
|
MAT 651 |
Applied Mathematics |
3 Credits |
|
Banach, Hilbert and Sobolev spaces; Fourier transforms and orthogonal functions; weak solutions; variational forms; Galerkin approximation; linear, elliptical limit and eigenvalue problems; Sturm-Liouville problems. Variational methods; their application of non-linear integral and elliptical differential equations; semigroup theory. |
||
|
MAT 652 |
Numerical Solutions of Common Differential Equations |
3 Credits |
|
Introduction to numerical methods; linear single- and multi-step methods. Runge-Kutta method. Convergence; Stiff differential equations; stability analysis and absolute stability. Numerical methods for two point boundary value problems: Shooting method. |
||
|
MAT 653 |
Numerical Solutions to Partial Differential Equations |
3 Credits |
|
MAT 654 Dynamic Systems (3-0) 3 |
||
|
MAT 654 |
Dynamic Systems |
3 Credits |
|
MAT 660 |
Selected Topics in Differential Equations |
3 Credits |
|
MAT 666 |
Selected Topics in Applied Mathematics |
3 Credits |
|
A course offered to allow the students get specialized in any of the special topics and theories of Applied Mathematics. |
||
|
MAT 670 |
Algebraic Geometry |
3 Credits |
|
MAT 671 |
Algebraic Topology I |
3 Credits |
|
Main group. Van Kampen theorem, covering spaces. Singular homology, homology long-complete sequence, Mayer Vietoris sequence. Cellular homology, simpicial homology. Axioms of homology; main groups and homology; applications of homology. |
||
|
MAT 672 |
Algebraic Topology II |
3 Credits |
|
Co-homology groups; universal factor theorem; co-homology of spaces. Multiplications in co-homology, Künneth formula. Poincare duality. Universal factor theorem for homology. Homotophy groups. |
||
|
MAT 673 |
Differential Geometry I |
3 Credits |
|
Differentiable manifolds, straight mapping, tangential and co-tangential beams, differential of a mapping, vector areas, tensor areas, differential forms, the concept of direction with manifolds, integration with manifolds, Stokes theorem. |
||
|
MAT 674 |
Differential Geometry II |
3 Credits |
|
Lie differential of tensor areas. Connections, covariant differentials of tensor areas, parallel shift, holonomy, bevel, twist. Levi-Civita (or Riemann) connection, geodesics, normal coordinates. sectional, Ricci and scaler bevels. |
||
|
MAT 675 |
Global Analysis |
3 Credits |
|
A course offered to allow the students get specialized in any of the special topics and theories of Topology and Geometry. |
||
|
MAT 676 |
Selected Topics in Topology and Geometry |
3 Credits |
|
MAT 681 |
Lie Groups and Lie Algebra |
3 Credits |
|
Definition and basic characteristics of Lie Groups and Lie Algebra; classical matrix Lie groups; Lie sub-algebra related with Lie sub-groups; masking groups; exponential mapping; association between Lie algebra and simple connection Lie groups; expression theory. |
||
|
MAT 682 |
Object Expansion and Galois Theory |
3 Credits |
|
Object expansion, object to serve for factorization of a polynom, multiple roots, Galois groups, criteria for solubility by radicals, Galois group as the permutational groups of the roots of n-degree polynoms; finite objects.MAT 683 Algebraic Numbers Theory (3-0) 3 |
||
|
MAT 683 |
Algebraic Numbers Theory |
3 Credits |
|
MAT 684 |
Analytical Numbers Theory |
3 Credits |
|
A course offered to allow the students get specialized in the special topics and theories of Numbers Theory. |
||
|
MAT 685 |
Applicable Analysis and computational Numbers Theory |
3 Credits |
|
MAT 686 |
Matrix Theory |
3 Credits |
|
A course offered to allow the students get specialized in any of the special topics and theories of Algebra. |
||
|
MAT 687 |
Ring Theory |
3 Credits |
|
MAT 688 |
Selected Topics in Numbers Theory |
3 Credits |
|
MAT 689 |
Selected Topics in Algebra |
3 Credits |
|
MAT 697 |
Seminar |
3 Credits |
|
MAT 699 |
Ph.D. Thesis |
3 Credits |
The students who do not hold a bachelor’s degree in mathematics, but wish to have graduate studies in Mathematics are required to take the following courses, and achieve a grade point average of at least 2.5 in the courses, within the framework of the scientific preparation program.
|
Course code |
Course Title |
|
MAT 209 |
Advanced Analysis I |
|
MAT 210 |
Advanced Analysis II |
|
MAT 211 |
Linear Algebra I |
|
MAT 215 |
Differential Equations |
|
MAT 309 |
Algebra |
|
MAT 311 |
Complex Functions Theory |
