Course Title | C/E | PO 01 | PO 02 | PO 03 | PO 04 | PO 05 | PO 06 | PO 07 | PO 08 |
ADVANCED ALGEBRA | E | | | | | | | | |
ADVANCED COMPLEX ANALYSIS | E | * | * | * | * | * | * | * | |
ADVANCED LINEAR ALGEBRA | E | * | | * | | * | | * | * |
ADVANCED PROGRAMMING | E | | | | | | | | |
ADVANCED REGULAR MATRIX MAPPINGS I | E | * | | * | | * | | * | * |
ADVANCED REGULAR MATRIX MAPPINGS II | E | * | | * | * | | * | * | |
ADVANCED RINGS THEORY II | E | * | | * | * | | | * | |
ADVANCED THEORY OF DIFFERENTIAL EQUATIONS | E | | | | | | | | |
ADVANCED TOPOLOGY | E | | | | | | | | |
ALGEBRAIC TOPOLOGY I | E | * | | * | * | * | | | |
ALGEBRAIC TOPOLOGY II | E | | * | * | * | * | * | | |
AN INTRODUCTION TO NONASSOCIATIVE ALGEBRAS | E | | | | | | | | |
ANALYSIS ON TIME SCALES I | E | * | | * | * | * | | | |
ANALYSIS ON TIME SCALES II | E | * | * | * | * | * | | | |
ANALYTICAL METHODS IN APPLIED MATHEMATICS | E | | | | | | | | |
APPLIED DIFFERENTIAL GEOMETRY I | E | * | | * | * | | | | * |
APPLIED DIFFERENTIAL GEOMETRY II | E | * | | * | * | | | | * |
APPLIED DIFFERENTIAL GEOMETRY-I | E | * | | * | * | | | * | * |
APPLIED DIFFERENTIAL GEOMETRY-II | E | * | | | * | | | * | * |
APPLIED MATHEMATICAL PROGRAMMING | E | | | | | | | | |
APPROXIMATE METHODS AND MATHEMATICAL MODELING | E | | | | | | | | |
APPROXIMATION THEORY OF FUNCTIONS I | E | * | | * | | * | * | | |
APPROXIMATION THEORY OF FUNCTIONS II | E | * | | * | * | | | * | |
AUTOMORPHIC FUNCTIONS | E | | | | | | | | |
CATEGORY THEORY | E | * | | | * | * | | | |
CLASSICAL AND MODERN METHODS ON SUMMABILITY THEORY I | E | * | | * | | * | * | | |
CLASSICAL AND MODERN METHODS ON SUMMABILITY THEORY II | E | * | | * | * | * | | | |
DIFFERENTIABLE MANIFOLDS -I | E | * | | * | * | | | | * |
DIFFERENTIABLE MANIFOLDS -II | E | * | | * | * | | | | |
DIFFERENTIAL GEOMETRIC METHODS IN ANALITIC MECHANICS I | E | * | | * | * | | | | * |
DIFFERENTIAL GEOMETRIC METHODS IN ANALITIC MECHANICS II | E | * | | * | * | | | | * |
DIFFERENTIAL GEOMETRY OF CURVES AND SURFACES I | E | * | * | * | * | | | | * |
DIFFERENTIAL GEOMETRY OF CURVES AND SURFACES II | E | * | * | * | * | | | | * |
ECONOMICS, GEOMETRY, DYNAMICS I | E | * | | * | * | * | | | |
ECONOMICS, GEOMETRY, DYNAMICS II | E | * | | * | * | * | | | |
FINITE DIFFERENCE EQUATIONS | E | * | | * | * | | | | |
FINITE DIFFERENCE METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS | E | | | | | | | | |
FRACTIONAL CALCULUS | E | | | | | | | | |
FRACTIONAL DIFFERENTIAL EQUATIONS | E | | | | | | | | |
FUNCTIONAL ANALYSIS I | E | * | | * | * | | * | | |
FUNCTIONAL ANALYSIS II | E | * | | * | * | * | * | | |
FUNCTIONAL EQUATIONS | E | * | | * | * | * | | | |
GENERALISED CLASSICAL MECHANICS AND FIELD THEORY I | E | * | | * | * | | | | * |
GENERALISED CLASSICAL MECHANICS AND FIELD THEORY II | E | * | | * | * | | | | * |
GEOMETRIC TOPOLOGY | E | | | | | | | | |
GRAPH AND COMBINATORICS | E | * | * | * | * | * | * | * | * |
GRAVITATION THEORIES AND COSMOLOGY | E | | | | | | | | |
GROUP THEORY I | E | * | | * | * | | | | * |
HIGHER DIFFERENTIAL GEOMETRY-I | E | * | | | * | | | | * |
HIGHER DIFFERENTIAL GEOMETRY-II | E | * | | * | * | | | | * |
HOMOLGY ALGEBRA | E | | | | | | | | |
HYPERBOLIC GEOMETRY | E | * | * | * | * | * | * | * | * |
INTEGRAL EQUATIONS | E | * | | * | * | | * | * | |
INTRODUCTION TO LORENTZIAN GEOMETRY | E | * | | * | * | | | * | * |
INTRODUCTION TO TOPOLOGY | E | * | | * | * | * | * | | |
JET MANIFOLDS AND JET BUNCHES I | E | * | | * | * | | | | |
JET MANIFOLDS AND JET BUNCHES II | E | * | | * | * | | | | * |
LATEX | E | | | | | | | | |
LORENTZIAN GEOMETRY | E | * | | | * | * | | * | * |
MATHEMATICAL ANALYSIS | E | * | * | * | * | * | * | * | * |
MATRIX THEORY | E | | | | | | | | |
METHODS OF RESEARCH AND ETHICS | E | | | | | | | | |
MODULE THEORY | E | | | | | | | | |
MÖBIUS TRANSFORMATIONS | E | * | * | * | * | * | * | * | * |
NON-COMMUTATIVE RINGS | E | * | * | * | * | | * | | * |
NUMERICAL SOLUTIONS OF INTEGRAL EQUATIONS | E | * | | * | * | | | * | * |
OPERATOR EQUATIONS THEORY I | E | | * | * | | | * | * | |
OPERATOR EQUATIONS THEORY II | E | * | | * | * | * | | | * |
OPTIMIZATION METHODS I | E | * | | * | * | | * | | |
OPTIMIZATION METHODS II | E | * | | * | * | | * | | |
POSITIVE LINEAR OPERATORS | E | | | | | | | | |
POSITIVE SOLUTIONS OF LINEAR OPERATORS I | E | | * | * | | | * | * | |
POSITIVE SOLUTIONS OF LINEAR OPERATORS II | E | * | * | | * | * | * | | |
RECURRENCE RELATIONS, FIBONACCI AND LUCAS NUMBERS | E | | | | | | | | |
REPRESENTATIONS OF GROUPS | E | | | | | | | | |
RING THEORY I | E | * | | * | * | | | * | * |
SELECTED TOPICS IN NUMERICAL ANALYSIS | E | | | | | | | | |
SEMI-RIEMANN MANIFOLDS I | E | * | | * | * | | | * | * |
SEMI-RIEMANN MANIFOLDS II | E | * | | * | * | | | * | * |
SOLUTIONS OF THE EINSTEIN FIELD EQUATIONS | E | | | | | | | | |
SPECIAL FUNCTIONS | E | * | | * | * | | * | * | |
SPECTRAL THEORY OF LINEAR DIFFERENTIAL OPERATORS | E | * | | * | * | * | | | |
STRUCTURAL CHARACTERISTIC OF FUNCTIONS ON COMPLEX PLANE I | E | * | * | | * | * | * | | |
STRUCTURAL CHARACTERISTIC OF FUNCTIONS ON COMPLEX PLANE II | E | * | * | * | * | * | * | | |
TENSOR GEOMETRY AND APPLICATIONS I | E | * | | * | * | | | | * |
TENSOR GEOMETRY AND APPLICATIONS II | E | * | | * | * | | | * | * |
THE GEOMETRY OF DISCRETE GROUPS | E | * | * | * | * | * | * | * | * |
THE THEORY OF GENERAL RELATIVITY AND INTEGRABLE SYSTEMS | E | | | | | | | | |
THEORY OF ADVANCED DIVERGENT SERIES I | E | * | | * | * | * | * | | |
THEORY OF ADVANCED DIVERGENT SERIES II | E | * | * | * | | * | * | * | * |
THEORY OF FUNCTIONS OF A REAL VARIABLE | E | * | * | | * | * | | | |
THEORY OF GENERALIZED FUNCTIONS AND APPLICATIONS | E | | | | | | | | |
TOPOLOGICAL AND METRIC SPACES | E | | | | | | | | |
TOPOLOGICAL GROUPS | E | | | | | | | | |
TOPOLOGICAL SEQUENCE SPACES | E | | | | | | | | |
UNBOUNDED LINEAR OPERATOR THEORY | E | * | | * | * | * | | | |