Matematik (İngilizce) Lisans Programı
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH101 |
Analysis I |
Fall |
C |
4+2 |
7 |
|
COURSE CONTENT |
Sequences; Functions of one variable; Limit; Continuity; Derivative; Geometric and physical meanings of derivative; Extremes; Indeterminate forms in limits; Differential; Sketching curves. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH102 |
Analysis II |
Spring |
C |
4+2 |
8 |
|
COURSE CONTENT |
Indefinite and definite integrals of functions; Calculation of area, arc length, surface area and volume with the help of Riemann integral; Improper integrals and convergence tests for improper integrals; Real valued series. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH103 |
Abstract Mathematics I |
Fall |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Propositions; Quantifiers; Proof methods; Sets and operations on sets; Relation; Function. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH104 |
Abstract Mathematics II |
Spring |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Operation and its properties; Cardinality of the sets; Finite, countable and uncountable sets; The construction of the number sets and algebraic operations on them; Summation and product notations. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH105 |
Analytic Geometry I |
Fall |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Vectors in plane; Coordinate systems in plane and in space; Line in plane; Vectors in space; Line in space; Coordinate systems in space; Plane in space |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH106 |
Analytic Geometry II |
Spring |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Conics; Analytical expression of conics; Elements of conics; Ellipse in plane; Circle in plane; Parabola in plane; Hyperbola in plane; Sphere surface; Cylinder surface; Cone surface; Ruled surfaces; Surfaces of revolution |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH201 |
Advanced Analysis I |
Fall |
C |
4+2 |
7 |
|
COURSE CONTENT |
Pointwise and uniform convergence in sequences and series of functions; Weierstrass M-test; Power series; Taylor series; Limit; Continuity and derivative of multivalued functions;, Partial derivatives; Maximum-minimum problems. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH202 |
Advanced Analysis II |
Spring |
C |
4+2 |
7 |
|
COURSE CONTENT |
Double integrals; Triple integrals; Spherical and cylindrical coordinates; Line integrals; Surface integrals; Fundamentals theorems and their applications of surface integrals |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH203 |
Linear Algebra I |
Fall |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
Systems of linear equations; Matrices and special matrices; Echolon form; Solutions of systems of linear equations; Determinants and their properties; Vector spaces; Subvector spaces; Vector space base and dimension |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH204 |
Linear Algebra II |
Spring |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
Inner product spaces; Orthogonal complement; Linear transformations and their properties; Matrices of linear transformations; Rank and kernel of linear transformation; Eigenvalues and eigenvectors of matrices; Diagonalization of matrices |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH205 |
Topology I |
Fall |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
The notions of metric and topology; Base for topology and subbase; The topological neighborhood system; Interior, exterior, boundary (or frontier) and closure of a set in a topological space; Accumulation and isolated points of a set in a topological space; Continuity in topological spaces. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH206 |
Topology II |
Spring |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
Homeomorphism; Separation axioms; Countable-separable spaces; Convergence in topological spaces; Product-quotient spaces; Compactness and connectedness in topological spaces. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH207 |
Introduction to Programming |
Fall |
C |
3+0+0 |
3 |
|
COURSE CONTENT |
Windows and their functions in the MATLAB/Octave programming software interface; Variable definitions and mathematical operations; Vectors and matrices; Conditional statements and loops; Functions and user-defined functions; Plotting graphs in two and three dimensions. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH208 |
Number Theory |
Spring |
C |
3+0+0 |
4 |
|
COURSE CONTENT |
Integers and their properties; Division algorithm; Base Arithmetic; Divisibility; GCD, LCM and applications; Linear Diophantine equations, Linear Diophantine equation systems, Arithmetic functions, Eulerin ϕ function, Möbius function, Congruence definition and properties, Congruence equations, Congruence applications, |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH209 |
Professional English I |
Fall |
C |
2+1+0 |
4 |
|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH213 |
Fuzzy Mathematics |
Fall-Spring |
S |
3+0+0 |
4 |
|
COURSE CONTENT |
Multi-valued logic; Classical sets; Fuzzy sets; Fuzzy set operations; Level sets of fuzzy sets; Fuzzy number and the extension principle; Arithmetic operations of fuzzy numbers; Fuzzy relations and their operations; Applications of fuzzy relations. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH214 |
Discrete Mathematics |
Fall-Spring |
E |
3+0+0 |
4 |
|
COURSE CONTENT |
Algorithms; The growth of functions and complexity of algorithms; The basics of counting; The pigeonhole principle; Permutations and combinations; Binomial coefficients and identities; Generalized permutations and combinations; An introduction to discrete probability; Bayes theorem; Expected value and variance. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH217 |
Projective Geometry I |
Fall-Spring |
E |
3+0+0 |
4 |
|
COURSE CONTENT |
Euclidean geometry; non-Euclidean geometries; Affine plane; Projective plane; Relationship between aaffine and projective plane; Other geometric structures |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH220 |
Symbolic Programming |
Fall-Spring |
E |
3+0+0 |
4 |
|
COURSE CONTENT |
Limit, derivative and integral calculations and applications in symbolic programming packages in MATLAB/Octave programming software. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH224 |
Basic Combinatorics |
Fall-Spring |
E |
3+0+0 |
4 |
|
COURSE CONTENT |
Mathematical induction and well-ordering; Recursive definitions and recursive algorithms; Solving linear recurrence relations; Divide-and-conquer algorithms and recurrence relations; Generating functions; Inclusion-exclusion; Finite-state machines with output and with no output. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH231 |
Fundamentals of Mathematics |
Fall-Spring |
C |
3+0+0 |
4 |
|
COURSE CONTENT |
Sets, numbers; Absolute value; Exponential and radical expressions; Functions; Equations; Inequality; Systems of equations; Trigonometry; Logarithm |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH301 |
Complex Analysis I |
Fall |
C |
4+0 |
6 |
|
COURSE CONTENT |
Algebraic; Geometric and topological properties of complex numbers; Complex sequences; Convergence of complex sequences; Analytic functions |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH302 |
Complex Analysis II |
Spring |
C |
4+0 |
6 |
|
COURSE CONTENT |
Elemantary functions and their derivatives; Cauchy-Rieamann equations; Harmonic functions; Complex curves; Complex integral; Cauchy-Goursat Theorem; Cauchy integral formula; Liouville Theorem and fundamental theorem of algebra; Taylor and Laurent series; Residues |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH303 |
Algebra I |
Fall |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
Binary operations; groups, subgroups; Cyclic groups; Normal subgroups; Quotient groups; Direct product of groups; Group homomorphism and isomorphism; Conjugate classes; Sylow subgroups. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH304 |
Algebra II |
Spring |
C |
4+0+0 |
6 |
|
COURSE CONTENT |
Rings; subrings; Ideals; Quotient rings; Ring homomorphism and isomorphism; Polynomial rings; Unique factorization domain |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH305 |
Differential Equations I |
Fall |
C |
4+0+0 |
4 |
|
COURSE CONTENT |
Definitions and terminology; Initial value problems; First order differential equations; Solution curves and direction fields; Separable, linear, homogeneous and exact equations; Solutions by substitutions; Higher order differential equations; Theory of linear equations; Initial and boundary value problems; Homogeneous and nonhomogeneous equations; Reduction of order; Homogeneous linear equations with constant coefficients; Undetermined coefficients; Variation of parameters; Cauchy-Euler equations. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH306 |
Differential Equations II |
Fall |
C |
4+0+0 |
4 |
|
COURSE CONTENT |
Series solutions of linear ordinary differential equations; Solutions about ordinary and regular singular points; The Laplace transform; Properties of the Laplace transform and the inverse Laplace transform; The unit step function and the convolution; Solution of initial value problems by the Laplace transform; Systems of linear first-order differential equations; Theory of linear systems; Solution of homogeneous and nonhomogenous linear systems; Solution of the systems by the Laplace transform. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH307 |
Differential Geometry I |
Fall |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Affine space; Euclidean space; Manifold; Tangent vector; Tangent space; Vector field; Covariant derivative; Curves; Curve pairs |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH308 |
Differential Geometry II |
Spring |
C |
4+0+0 |
5 |
|
COURSE CONTENT |
Orientation on hypersurfaces; Shape operatör; Fundamental forms; Gaussian transformation; Gaussian curvature; Mean curvature; Geodesic curvature; Normal curvature; Some hypersurfaces |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH309 |
Numerical Analysis |
Fall |
E |
3+0+0 |
4 |
|
|
COURSE CONTENT |
Mathematical preliminaries on numerical calculations; Numerical solutions of nonlinear equations and systems of nonlinear equations; Numerical solution of systems of linear equations; Direct solution methods and iterative methods; Eigenvalue problem in matrices and numerical solution methods; Interpolation; Curve fitting; Numerical derivative and numerical integration. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH310 |
Applied Numerical Methods |
Fall-Spring |
E |
3+0+0 |
4 |
|
|
COURSE CONTENT |
Solution of nonlinear equations using computer programs (programming software such as MATLAB/Octave etc.) and numerical solution methods; Approximation to functions and interpolation; Numerical differentiation and integration. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH311 |
Vector Analysis I |
Fall-Spring |
C |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Differential and integral of vector valued functions; Surface integrals; Vector fields; Integrals of vector fields |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH313 |
Kinematics |
Fall-Spring |
E |
3+0+0 |
4 |
|
|
COURSE CONTENT |
Dual numbers; Ring of dual numbers; Matrix representation of dual numbers; Dual vectors; Dual vector spaces; E-study transformation; Theory of quaternions |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH314 |
Transformations and Geometries |
Fall-Spring |
E |
3+0+0 |
4 |
|
|
COURSE CONTENT |
Transformations; Transformation groups; Classification of geometries using transformations; Types of motion in the plane; Similarity transformations |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH315 |
Introduction To Coding Theory |
Fall-Spring |
E |
3+0+0 |
4 |
|
|
COURSE CONTENT |
Basic assumptions, correcting and detecting error patterns, finding the most likely codeword transmitted, error-detecting codes and error-correcting codes; Linear codes, generating and parity check matrices; Some bounds for codes, perfect codes; Hamming codes, the extended Golay code, Reed-Muller (RM) codes. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Wee k) |
ECTS |
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|
MATH316 |
Spectral Theory I |
Fall-Spring |
E |
2+0+0 |
4 |
|||||
|
COURSE CONTENT |
Introduction to spectral theory; Linear operators; Boundary conditions and definition of Sturm- Liouville operators; Lagrange identity; Positive, symetric and selfadjoint Sturm-Liouville operators; Eigenvalues and eigenfunctions of selfadjoint operators; Examples of eigenvalues and eigenfunctions; Finding the solutions of Sturm-Liouville equation; Getting the solutions by consecutive approximation; Asymptotics of functions; Obtaining the asymptotics of the solutions of Sturm-Liouville equations; Getting the asymphtotics of eigenvalues; Calculating the asymphtotics of eigenfunctions. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH317 |
Fourier Analysis |
Fall-Spring |
C |
3+0+0 |
6 |
|||||
|
COURSE CONTENT |
Fourier series; Fourier integra; Derivatives of Fourier mappings |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH318 |
Preparing Scientific Documents |
Fall-Spring |
E |
2+0+0 |
4 |
|||||
|
COURSE CONTENT |
Latex document structure; Mathematical expressions; Graphs and tables; References and tagging; Bibliography management. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH321 |
Introduction To Crytography |
Fall-Spring |
E |
3+0+0 |
4 |
|||||
|
COURSE CONTENT |
Encryption schemes, symmetric-key encryption; Fiestal ciphers and DES; Algorithms, complexitiy, and modular arithmetic, quadratic residues, primality testing, factoring and square roots, discrete logarithms; One-way and hash functions, RSA, ElGamal, cryptographic protocols. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Wee k) |
ECTS |
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|
MATH322 |
Scattering Theory I |
Fall-Spring |
E |
2+0+0 |
4 |
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|
COURSE CONTENT |
L1 and L2 spaces; Parameter dependent integrals; Fourier transform and its properties; Examples of Fourier transforms; Asymptotic equalities; Jost solution and its properties; Asymptotics of the Jost solution with respect to x and 𝜆 variables; Jost function and its zeros; Scattering function; Scattering data and its properties. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH323 |
Introduction To Graph Theory |
Fall-Spring |
E |
3+0+0 |
4 |
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|
COURSE CONTENT |
Graph terminology, representing graphs and graph isomorphism; Directed graphs; Trees and characterizations of trees, spanning trees, optimization and trees; Matchings and covers. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH324 |
Metric Spaces I |
Fall-Spring |
E |
3+0+0 |
6 |
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|
COURSE CONTENT |
Sets and functions; Absolute value and some inequalities; Convergence and continuity in real numbers; Metric spaces; Normed spaces; Convergence in metric spaces; Topological analysis of metric spaces. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
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|
MATH325 |
Metric Spaces II |
Fall-Spring |
E |
3+0+0 |
6 |
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|
COURSE CONTENT |
Covergence and completeness in metric spaces; Banach Fixed-point Theorem; Continuity and compactness in metric spaces. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH401 |
Introduction to Funtional Analysis |
Fall |
C |
4+0 |
6 |
|
COURSE CONTENT |
Metric spaces; Normed spaces; Linear and bounded operators; Hahn Banach theorem; Banach Steinhauss theorem; Open mapping and closed graph theorem. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH402 |
Graduation Exercise |
Bahar |
C |
2+0+0 |
6 |
|
COURSE CONTENT |
Scientific research; Scientific ethics; Literature review; Classification of resources. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH403 |
Theory of Complex Functions |
Fall-Spring |
C |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Linear and non-linear complex mappings; Conform mappings; Analytical functions; Argument theorem and related results; Riemann surfaces |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH404 |
Functional Analysis |
Fall-Spring |
C |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Hilbert spaces; Compact operators; Adjoint; Self-adjoint operators; Volterra operators |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH405 |
Partial Differential Equations |
Fall |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Basic concepts and classification of partial differential equations; First order partial differential equations; Types and normal forms of second order linear differential equations; Hyperbolic, parabolic and elliptic equations; Method of separation of variables; Fourier series; Solution of one-dimensional heat and wave equations. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH406 |
Real Analysis |
Fall-Spring |
C |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Set classes; Measure function; Measurable set and measurable function; Lebesgue integrals; Lp spaces |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH407 |
Applied Mathematics |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Linear equation systems and operator method; Eigenvalue problems; Sturm-Liouville systems; Eigenfunctions, and orthogonal function spaces; Eigenfunction expansions; Mean convergence; Completeness; Parseval`s identity; Adjoint forms and Lagrange identity; Singular (irregular) Sturm- Liouville systems; Oscillatory solutions; Sturm separation and comparison theorems |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH409 |
Nonlinear Dynamical Systems |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Fixed points and stability analysis of one-dimensional models; Bifurcation and bifurcation types; Solutions of two-dimensional linear systems and classification of fixed points; Analysis of phase planes of two-dimensional nonlinear systems. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH410 |
Cyclic Linear Codes |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Cyclic codes, generating and parity check matrices for cyclic codes; Finite fields, minimal polynomials; Cyclic Hamming codes, BCH codes, Reed-Solomon codes, Burst error-correcting codes; Berlekamp- Massey algorithm. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
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MATH411 |
Module Theory |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Module definition and module examples; Submodules; Finite generated modules; Cyclic modules; Simple modules; Module homomorphisms; Module isomorphism theorems; Torsional modules; Quotient modules; Orthogonal sums of modules; Complete sequences (short complete sequences, fragmented complete sequences); Free modules and vector spaces. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH412 |
Elliptic Functions and Integrals |
Fall-Spring |
C |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Elliptic functions; Derivatives; Integrals and graphs of elliptic functions |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
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MATH413 |
Numerical Solutions Of Ordinary Differential Equations |
Fall |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Initial value problems; Difference equations; Stability, consistency and convergence analysis; Runge- Kutta methods; Extrapolation method; Stability analysis; Stiff systems; Adaptive methods; Multi-step methods; General linear multi-step methods; Predictor-corrector methods; Hybrid methods; Numerical solution methods for boundary value problems. |
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Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH415 |
Graph Theory |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Cuts and connectivity, k-connected graphs; Vertex colorings and upper bounds, structures of k- chromatic graphs, counting proper colorings; Embeddings and Euler`s formula, characterization of planar graphs, parameters of planarity; Line graphs and edge-colorings, Hamilton cycles. |
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|
Course Code |
Course Name |
Course Name |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH416 |
Spectral Theory II |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Periodic and antiperiodic Sturm-Liouville operators; Lagrange formula for periodic and antiperiodic Sturm-Liouville operators; Examples of finding eigenvalues and eigenfunctions; Asymptotics of the eigenvalues and eigenfunctions of periodic and antiperiodic operators; Singular Sturm-Liouville operator; General eigenvalue problems; Multiple of eigenvalues; Integral representation of the Jost solution and its asymptotics; Jost function and its properties; Resolvent operator; Examples of resolvent operator; Continuous spectrum; Zeros of Jost function and discrete spectrum. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH416 |
Field Extensions |
Fall-Spring |
S |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Vector spaces and linear transformations; Field extensions; Algebraic extensions; Decomposition fields; Field isomorphisms and extensions; Separability; Finite extensions; Galois Theory; Galois group of polynomials; Solutions of polynomial equations |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH417 |
Manifolds I |
Fall-Spring |
E |
3+0+0 |
6 |
|
|
COURSE CONTENT |
Euclidean space; Topological concepts; Differentiability in Rn; Introduction to the concept of manifolds; Topological manifolds; Differentiable manifolds; Differentiable manifold examples; Smooth functions on manifolds; Smooth functions between manifolds; Diffeomorphisms; Partial derivatives; Inverse function theorem |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
|
MATH418 |
Manifolds II |
Fall-Spring |
E |
3+0+0 |
6 |
|
COURSE CONTENT |
Submanifolds; Submanifold examples; Curves on manifolds; Darboux frame; Vector bundles; Tangent vectors and tangent space on manifolds; Vector field on manifolds; Dual vector field; Derivative transformation; Pull-back transformation; Exterior derivative, inner derivative and Lie derivative; Distributions and integral manifolds; Riemann manifolds |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH420 |
Mathematical Biology |
Fall-Spring |
E |
3+0+0 |
6 |
|
COURSE CONTENT |
Applications of difference equations and differential equations in biology; Stability, stability analysis and applications; Bifurcations, bifurcation theory and applications. |
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|
Course Code |
Course Name |
Course Name |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH422 |
Scattering Theory II |
Fall-Spring |
E |
3+0+0 |
6 |
|
COURSE CONTENT |
Vector valued L1 and L2 spaces; Asymptotic equalities for vector valued functions; Dirac system; Jost solutions of Dirac system; Integral representation for Jost solution; Asymtotics of Jost solution; Scattering function of Dirac system and its properties; Scattering matrix of Dirac system and its properties; Sturm-Lioville equation on the whole real axis. |
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|
Course Code |
Course Name |
Semester |
Course Type (C/E) |
T+P+L (Hour/Week) |
ECTS |
|
MATH423 |
Introduction to Geometric Topology |
Fall-Spring |
E |
3+0+0 |
6 |
|
COURSE CONTENT |
Product and quotient spaces; n-dimensional usual topological space; Surfaces; Connected sum; Classification of surfaces and some invariants; Graphs and trees; Simplicial complexes. |
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