1

COURSES OF STUDIES

for

M.A/M.Sc Part –I Examination -2014-2015

M.A/M.Sc Part –II Examination -2015-2016

MATHEMATICS

Ravenshaw University

Cuttack

2

M.Sc. (Mathematics)

First Semester

M 1.1.1 Abstract Algebra 50

M 1.1.2 Real Analysis 50

M 1.1.3 Complex Analysis 50

M 1.1.4 Topology 50

M 1.1.5 Linear Algebra 50

Second Semester

M 1.2.6 Discrete Mathematics 50

M 1.2.7 Advanced Analysis 50

M 1.2.8 Numerical Analysis 50

M 1.2.9 Functional Analysis 50

M 1.2.10 Practical 50

Third Semester

M 2.3.11 Optimization Theory 50

M 2.3.12 Differential Equation 50

M 2.3.13 Probability and Stochastic Processes 50

M 2.3.14 Elective - I 50

M 2.3.15 Elective - II 50

Fourth Semester

M 2.4.16 Differential Geometry 50

M 2.4.17 Calculus in vector spaces 50

M 2.4.18 Operator Theory 50

M 2.4.19 Elective - I 50

M 2.4.20 Elective - II 50

Elective – I

A. Computational Finance I and II

B. Theory of Computation I and II

C. Operations Research I and II

D. Fractals I and II

E. Fuzzy sets and their applications I and II

Elective – II

A. Fluid Dynamics I and II

B. Graph Theory I and II

C. Numerical solution of Differential and Integral Equation I and II

D. Design and Analysis of Algorithms I and II

E. Number Theory and Cryptography I and II

3

First Semester Paper - I (M 1.1.1)

Abstract Algebra

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Normal Subgroups: Normal Subgroups & Quotient groups, Isomorphism theorems,

Automorphisms. Normal and Subnormal Series: Normal series, Solvable groups, Nilpotent

groups. Permutation groups: Cyclic decomposition, Alternating group An, Simplicity of An.

Unit - II 13 Marks

Direct products, finitely generated abelian group, Sylow’s theorem, groups of order p,2 pq,

Unique factorization domains Principal Ideal domains, Euclidean domains, Polynomial rings

over UFD.

Unit - III 13 Marks

Field Theory : Algebraic Extensions of fields, algebraically closed fields. Normal and separable

extensions: Splitting fields, Normal extensions, Multiple roots, Finite fields, Galois Theory:

Automorphism groups and fixed fields, fundamental theorem of Galois theory. Applications of

Galois Theory to classical problems: Polynomials solvable by radicals, Ruler and compass

constructions.

Book Prescribed:

Basic Abstract Algebra. P. B. Bhattacharya, S. K. Jain, S.R.Nagpaul 2nd edition (Cambridge

University Press).

Unit - I

Chapter -5 (5.1,5.2, 5.3), 6 (6.1, 6.2, 6.3), 7 (7.1, 7.2, 7.3)

Unit - II

Chapter -8[8.1, 8.2, 8.4 (8.4.1, 8.4.2, 8.4.3, 8.4.4, 8.4.7), 8.5], 11 (11.1 to 11.4)

Unit - III

Chapter - 15 [15.1, 15.2, 15.3, 15.4 (excluding 15.4.2, 15.4.3,15.4.4)], 16 (16.1 to 16.4), 17

(17.1,17.2), 18(18.3, 18.5)

Books for reference:

1. Algebra by M. Artin (PHI)

2. Modern Algebra by Surjeet Singh and Quazzirmuddin

3. Topics in algebra by I. N. Herstein.

4. Basic Algebra Vol-I, Vol-II by M. Jacobson, W.H. Freeman.

5. First Course on Abstract Algebra, John B. Frank. Sh

6. Fundamentals of Abstract Algebra. By D. S. Mallick et. al.

4

Paper - II (M 1.1.2)

Real Analysis

FM – 40 + 10 Time : 3 Hrs.

Unit – I 14 Marks

The Riemann - Stieltjes integral: Definition and Existence of the integral, properties of the

integral, Integration and differentiation.

Sequence and series of Functions, uniform convergence, continuity, integration, Differentiation.

Unit - II 13 Marks

Lebesgue Measure and Integral: Introduction, Outer measure, Measurable sets and Lebesgue

measure, A non-measurable set, measurable function. The Riemann integral, The Lebesgue

integral of a bounded function over a set of finite measure. The integral of a non-negative

function. The general Lebesgue integral.

Unit - III 13 Marks

Differentiation and Integration: The classical Banach spaces

Differentiation of monotone function, Functions of bounded variation.

Differentiation of an integral, Absolute continuity. LP spaces. The Holder and Minkowski’s

inequalities and completeness, Bounded linear functional on the LP spaces.

Books Prescribed:

1. Principles of Mathematical analysis - Walter Rudin

Chapter - 6 (6.1 to 6.22), 7 (7.1 to 7.18)

2. Real Analysis - H. L. Royden (3rd edition)

Chapter-3 (1 to 5), 4 (1 to 4), 5(1 to 4), 6 (except 4)

5

Paper - III (M.1.1.3)

Complex Analysis

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Power series, analytic function, Analytic functions as mappings, Mobius transformations, power

series representation of Analytic function.

Unit - II 13 Marks

Zeros of analytic function, The index of a closed curve, Cauchy’s theorem and integral formula,

Morera’s theorem, Lioville’s theorem, Fundamental theorem of Algebra, zeros,

Goursat theorem.

Unit - III 13 Marks

Classification of singularities, poles, absolute converagence, Laurents series development,

Casorati Weirstrass theorem, Maximum modulus theorem, Schwartz’s Lemma.

Book Prescribed:

Functions of One complex variable - J. B. Conway

Chapter - III (1-3), IV (2-5,7,8), V (1,3), VI (1,2).

Paper - IV (M 1.1.4)

Topology

FM - 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Topological spaces, Basis and order of topology, product and subspace topology, closed set,

limit points, continuous function, Product topology.

Unit - II 13 Marks

Connected spaces, connected sets in real line. Compact spaces. Compact sets in the real Line,

limit point compactness.

Unit - III 13 Marks

The countability axioms. The separation axioms. The Urysohn lemma. The Urysohn metrization

theorem. Tychonof theorem.

Book prescribed:

Topology A First course - J. R. Munkers

Chapter 2 (2.1-2.8), 3(3.1-3.7), 4(4-4.4), 5 (5.1).

6

Paper - V (M 1.1.5)

Linear Algebra

FM – 40 + 10 Time : 3 Hrs.

Unit-I

Dual Space, Finite dimensional vector space, isomorphism of finite vector space, annihilator,

Modules, finitely generated modules, cyclic sub-modules, T-annihilator, Linear Transform(LT),

algebra of LT, Isomorphism of LT, Cauchy Hamilton Theorem, invertible LT, singular LT,

Characteristic Roots, Linear Independence of Characteristic Roots(CR), distinct CR, CR vectors,

Canonical Forms, Triangular Form, Triangular Matrix.

Unit-II

Canonical Forms, Nilpotent Transforms, Index of Nilpotence, A decomposition of V: Jordan

Form, Rational canonical form, Monic.

Unit-III

Inner Product Space: Inner Product, Standard Inner Product, Polarization identities, Euclidean

space, Unitary space, Cauchy-Schwartz inequality, Orthogonal set, Orthonormal set, Orthogonal

complement, Orthogonal projection, Bessel’s inequality, Linear Functional and Adjoints, Linear

Operators, Unitary operator and Normal operators.

Books Prescribed:

1. Topics in Algebra: I.N. Herstein

Chapters: 4(4.3,4.5), 6(6.1,6.2,6.4,6.5,6.6,6.7)

2. Linear Algebra: K. Hoffman & R. Kunz

Chapters: 8(8.1-8.5)

7

Second Semester

Paper -I (M.1.2.6)

Discrete Mathematics

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Graphs : Graphs and Graph models, Graph terminology and special type of graphs, representing

graphs and Graph Isomorphism, connectivity, Euler and Hamilton paths, shortest path problems,

planar graphs

Trees: Introduction to trees, application of trees, Tree traversal, spanning trees, minimum

spanning trees

Unit - II 13 Marks

Boolean Algebra: Boolean functions, representing Boolean functions, Logic gates, minimization

of circuits

Unit - III 13 Marks

Modelling computation: Languages and Grammars and Languages, Finite state machines with

output, finite state machines with no output, language recognition, Turing machines

Book prescribed:

1. Discrete Mathematics and its Applications, Kenneth H. Rosen, Tata Mc-Graw Hill

Education private Limited, Seventh Edition (Indian adaptation by Kamala Krithivasan),

2012

Chapter 8 (8.1-8.7), 9 (9.1-9.5), 10(10.1-10.4), 12(12.1-12.6)

Books for reference:

1. Discrete Mathematical structures with Application to Computer Science - J. P. Tremblay

and R. Monohar

2. Discrete Mathematics for Computer Scientists and Mathematicians by Joe L. Mott,

Abraham Kandel and Theodore P. Baker (Prentice-Halia).

8

Paper - II (M 1.2.7)

Advanced Analysis

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Integration of vector valued functions rectifiable curves. Equi-continuous families of function,

The Stone Weierstrass theorem.

Unit - II 13 Marks

Fourier series, Orthogonal and Orthonormal system of functions, Bersets inequality. Dirichlet –

Kernel, pointwise convergence of Fourier series. Approximation theorems, Parseval’s theorem.

Unit - III 13 Marks

Harmonic functions, Basic properties of Harmonic functions, Harmonic functions on a disk,

Dirichlet problem, Green’s function. Entire functions, Jenson’s formula, Genus & order of an

entire function Hardamard factorization theorem.

Books Prescribed:

1. Principles of Mathematical Analysis – W. Rudin (3rd

edition)

Chapter 6(23,24,25,26,27), 7(19 to 33), 8(8-9 to 8-16)

2. Function of one complex variable – J.B. Conway

Chapter X (1,2,4,5), XI(1,2,3)

9

Paper - III (M 1.2.8)

Numerical Analysis

FM – 40 +10 Time : 3 Hrs.

Unit - I 14 Marks

Approximation of functions: Weierstrass theorem and Taylor’s theorem, Minimax approximation

problem, least square approximation problem, orthogonal polynomials,

least square approximation problem(Continued).

Unit - II 13 Marks

Numerical solution of systems of linear equations: Gaussian Elimination, pivoting and scaling in

Gaussian Elimination, variants of Gaussian Elimination, Error analysis, Residual correction

method, iteration methods, Error prediction and acceleration.

Unit - III 13 Marks

Eigen value location, error and stability results; Hermite interpolation, Piecewise polynomial

interpolation(Cubic spline interpolation, B-spline curves).

Book Prescribed:

An introduction to Numerical Analysis (2nd Edition) – Kendall E Atkinson (Wiley)

Chapter 3(3.6, 3.7), 4(4.1-4.5), 8(8.1-8.7), 9(9.1).

10

Paper - IV (M 1.2.9)

Functional Analysis

FM – 40 + 10 Time : 3 Hrs.

Unit-I

Metric Space, Definition and examples, Open Set, Close Set, Neighborhood, Convergence,

Cauchy Sequence, Completeness Definition of a Continuous mapping space, Banach Space,

Properties of normed Space, Finite dimensional normed Spaces and subspaces. Compactness and

finite dimensional Linear operator, Bounded and Continuous linear operators, Linear functional,

linear functional and operator on finite dimensional spaces, Normed spaces of operators, Dual

space.

Unit-II

Inner product space and its properties, Hilbert space, Orthonormal Sets and sequences, Total

orthonormal sets and sequences, Representation of functional on Hilbert Spaces, Hilbert adjoint

operators self adjoint, Unitary and normal operator.

Unit-III

Fundamental Theorems for normed and Banach Spaces. Zern`s Lemma, Hahn Banach theorems,

Hahn Normed space, Application to bounded linear functional on C[a,b], Adjoint operator,

Reflexive spaces, Bair’s Category theorem, Uniform Boundedness theorem , Strong and weak

convergence open mapping Theorem, Closed linear operator, closed graph theorem.

Book Prescribed:

Introductory Functional Analysis with Applications-Erwin Kreyszig

Chapters: 1(1.1-1.5), 2(2.2-2.10), 3(3.1-3.4,3.6,3.8-3.10), 4(4.1-4.8,4.12, 4.13)

11

Paper - V (M 1.2.10)

Practical-Programming in C

(Exp-30-Viva - 10 - Record – 10)

FM - 50 Time : 3 Hrs

List of Experiments :

1. To calculate mean & Standard deviation.

2. To calculate Pearson’s coefficient of correlation

3. To find area under a curve.

4. Lagrange’s interpolation.

5. Gauss elimination.

6. Inverse of a matrix.

7. To find Eigen value & Eigen vectors.

8. Runge Kutta method

9. Finding minimax approximation to e by Chebyshev’s polynomials.

10. Approximating definite integral by Newton cotes, Gauss quadrature rule.

12

Third Semester Paper -I (M 2.3.11)

Optimization Theory

FM – 40 + 10 Time : 3 Hrs.

Unit - I 13 Marks

One dimensional Optimization: Introduction, function comparison methods, polynomial

interpolation, iterative methods

UNIT-II 13 Marks

Gradient based optimization methods (I) : Calculus of Rn, method of steepest descent, conjugate

gradient method, The generalized gradient method, gradient projection method

Gradient based optimization methods (II) : Newton type methods (Newton’s method,

Marquardt’s method), Quasi- Newton methods.

UNIT-III 14 Marks

Linear programming: Convex analysis, simplex method, two phase simplex method, Duality,

Dual simplex method

Constrained optimization methods: Lagrange multipliers, Kuhn-Tucker conditions, convex

Optimization, Penalty function techniques, methods of multiplier, linear constrained problems-

cutting plane method

Text recommended

1. M.C. Joshi and K. Moudgalya, Optimization: Theory and Practice, Narosa Publishing

House, New Delhi, 2004

2. J.A. Snyman, Practical Mathematical Optimization, Springer Sciences, 2005

13

Paper -II(M 2.3.12)

Differential Equation FM – 40 + 10 Time : 3 Hrs.

UNIT-I 14 Marks

Differential Equations:

Existence and Uniqueness of solutions, Lipschitz condition, Gronwall inequality, Successive

approximations, Picard’s theorem, Continuation and dependence on initial conditions, Existence

of solutions in the large, Existence and uniqueness of solution of systems, Fixed point method,

Sytems of linear differential equations, nth order equation as a first order systems, system of first

order equations, Existence and uniqueness theorem, fundamental matrix, non-homogeneous

linear systems, linear systems with constant coefficients.

Non-linear differential equations, Existence theorems, External solutions, Upper and lower

solutions, Monotone iterative method, and method of quasi-linearization. Stability of liner and

non-linear systems, Critical points, systems of equations with constant coefficients, linear

equations with constant coefficients, Lyapunov stability.

UNIT-II 13 Marks

Boundary value problems for ordinary differential equations, Sturm-Liouville problem, Eigen

value and Eigen functions, Expansion in eigen functions, Green’s function, Picard’s theorem for

boundary value problem, series solution of Legendre and Bessel equations.

UNIT-III 13 Marks

Laplace’ equation: Boundary value problem for Laplace’ equation, Fundamental solution,

integral representation and mean value formula a for harmonic function, Green’s function for

Laplace’s equation, solution of Dirichlet’s problem for a ball, solution by separation of variables,

solution of Laplace’s equation for a disc, the wave equation and its solution by the method of

separation of variables, D’ Alembert’s solution, of the wave equation,

Books recommended

1. S.D. Deo, V, Lakhmikanthan and V. Raghavendra Textbook of rdinary Diffrential

equation, 2nd

edition, TMH, Chapter: 4 (4.1-4.7), 5, 6 (6.1-6.5), 7 (7.5), 9 (9.1-9.5)

2. J. Sinharoy and S. Padhy: A course of ordinary and partial differential equation. Kalyani

Publishers, Chapters: 10, 15, 16 and 17.

14

Paper -III(M 2.3.13)

Probability and Stochastic Processes FM – 40 + 10 Time : 3 Hrs.

UNIT-I 14 Marks

Random Variables : Introduction, Function of Random variables, moments and generating

functions.

Multiple Random Variables: Independent random variables, functions of several random

variables, Covariance, Correlation and moments, conditional Expectation

Some Special distributions : The Bivariate and Multivariate Normal Distributions. The

exponential Family of distributions.

Unit - II 13 Marks

Limit Theorems : Modes of convergence, the weak law of large numbers, Strong Law of Large

numbers, Limiting Moment generating functions, central limit theorems

Sample moments and their distributions : Random sampling sample characteristics and their

distribution, chi-square, t and F distributions: Exact sampling distribution

UNIT-III 13 Marks

Stochastic processes: Definition with examples, Markov chains, Chapman Kolmogorov

equations, Classification of states, Limiting probabilities, some applications: The gambler’s Ruin

problem

Continuous-time Markov chains. Birth-and-death processes, transition probability function

Limiting Probbailities

Book Prescribed:

1. An introduction to Probability and Statistics by V. K. Rohatgi and A.K. Md. Ehasanes

Saleh, Second edition, John Wiley and Sons.

Chapter 3, 4 (4.1-4.6), 5, 6, 7 (7.1-7.4)

2. An introduction to Probability Models by Sheldon M. Ross, Academic Press Harcourt

India Private Limited) Chapter 4 (4.1-4.5.1), 6 (6.1-6.5)

15

Paper - IV (M 2.3.14)

A- Computational Finance-I

(Elective - I)

FM - 40 + 10 Time : 3 Hrs.

UNIT-I

Basic concepts of Financial – Stock options, Forward and futures, Speculation, Hedging ,

Put-call parity, Principle of non-arbitrage pricing, Computation of volatility

Derivation of Black-Scholes differential equation and Black –Scholes Option Pricing

formula, Greeks and Hedging strategies.

UNIT-II

Finite difference methods for partial differential methods- finite difference approximation to

derivatives, Explicit and Implicit methods for parabolic equations, Iterative methods for

solution of a system of liner algebraic equations, two dimensional parabolic equations,

alternating-direct implicit method, convergence, stability and consistency of finite difference

schemes.

UNIT-III

Binomial pricing models, Explicit and implicit finite difference methods for European and

American options, Monte Carlo simulation

Books recommended:

1. J Bax and G Chacko- Financial derivatives: Pricing, applications and Mathematics-

Cambridge University Press, 2004.

2. G. D. Smith: Numerical Solution of Partial Differential Equations, Oxford University

Press.

3. P. Wilmott: Qualitative Finance- John Wiley, 2000.

16

Paper - IV (M 2.3.14)

B- Theory of Computation – I

(Elective -I)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Introduction of finite automata, Central concepts of automata theory, Informal picture of finite

automata, Deterministic finite automata, Non - deterministic finite automata, Application.

Unit - II 13 Marks

Regular expressions, Finitet automata and regular expressions, Application of regular

expressions, Algebraic law of regular expressions, Pumping lemma and its application for

regular language, Closure and Decision properties of regular languages.

Unit - III 13 Marks

Context - free Grammars, Parse trees, ambiguity in grammar & Languages, Pushdown

automation, The language of PDA, Equivalence of PDAs and CFS’S, Deterministic pushdown

automata, Change key normal form, The pumping lemma for context free languages, Decision

properties of CFL’s.

Books Recommended:

1. J E. Hoperoft, R MOtwani J. D. Uliman- Introduction to Automata Theory Languages and

compulaton (2nd Edition)Pearson Education 2001

2. M. Sipson Introduction to Theory of compulation Thomson Leamings.

3. R. Greenlan H. J. Hooer - Fundamentals of the Theory of computation, principles and practice

- Harcourt India Pvt.

4. Peter linz - An introduction to Forml Languages and Automata Narosa Publishing Hosue

1998.

17

Paper - IV (M 2.3.14)

C- Operation Research – I

(Elective -1)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Integer Programming and Dynamic Programming

Unit – II 13 Marks

Sequencing problems and games and strategies.

Unit - III 13 Marks

Queuing Theory- Introduction to Poisson Queuing Systems.

Book Prescribed:

Operation Research (Ninth Edn. 2001) Kanti Swarup, P.K. Gupta and Manmohan (S.C)

Chapter 7, 12, 13,17 (17.1-17.9), 20(20.1-20.8)

18

Paper - IV (M 2.3.14)

D- Fractals – I

(Elective -I)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Metric Spaces, Equivalent spaces, classification of subsets and the space of fractals,

Transformation on Metric Spaces, contraction mappings and the construction of Fractals.

Unit - II 13 Marks

Chaotic Dynamics on Fractals

Unit - III 13 Marks

Fractal Dynamics

Book Prescribed:

Fractal Everywhere - Michacl F. Bamsley

Chapter - II, III, IV, V

19

Paper - IV (M 2.3.14)

E- Fuzzy Sets and their Application-I

(Elective - I)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Fuzzy sets - Basic definition a -level sets. Convex fuzzy sets. Baic operations Fuzzy sets. Type

of Fuzzy sets. Cartesian products. Algebraic products. Bounded sum and difference t-norms and

t-conorms.

The extension Principle- The Zadeh’s extension principle image and inverse image of Fuzzy

arithmetic.

Unit - II 13 Marks

Fuzzy Relation and Fuzzy Graphs-Fuzzy equivalence equations. Fuzzy graphs, Similarity

relation.

Unit - III 13 Marks

Possibility theory-Fuzzy measures, Evidence theory necessity measure, Possibility theory versus

probability theory.

Books Prescribed:

1. Fuzzy set theory and its application allied publisher rd New Delhi - 1991 - U. Z. Zimmermann

2. Fuzzy set and fuzzy logic prentice Hall of Indi New Delhi 1995- G J Klir & Bo Yuan

20

Paper - V (M 2.3.15)

A - Fluid Dynamics - I

(Elective - II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Basic Concepts

Unit - II 13 Marks

Fundamental Equations of the flow of viscous fluids. Dynamical similarity, inspection and

Dimensional Analysis.

Unit - III 13 Marks

Exact solutions of Navier - Stokes Equations (Restricted)

Book Prescribed:

Viscous Fluid Dynamics - J.L. Bansal, Oxford & IBH Publishing. Co.

Chapter (2.1-2.6), 3 (3.1-3.4, 3.8, 3.9), (4.1-4.6).

21

Paper - V (M 2.3.15)

B - Graph Theory- I

(Elective - II)

FM – 40 + 10 Time : 3 Hrs.

UNIT-I

Fundamental Concepts : Basic Definitions. Graphs, Vertex degrees, Walks, Paths, Trails,

Cycles, Circuits, Subgraphs, Induced subgraph, Cliques, Components, Adjacency Matrices,

Incidence Matrices, Isomorphisms. Graphs with special properties : Complete Graphs.

Bipartite Graphs. Connected Graphs, k-connected Graphs, Edge-connectivity, Cut-vertices, Cut-

edges. Eulerian Trails, Eulerian Circuits, Eulerian Graphs : characterization, Hamiltonian

(Spanning) Cycles, Hamiltonian Graphs : Necessary condition, Sufficient conditions (Dirac, Ore,

Chvatal, Chvatal-Erdos), Hamiltonian Closure, Traveling Salesman Problem.

UNIT-II

Trees : Basic properties, distance, diameter. Rooted trees, Binary trees, Binary Search Trees.

Cayley’s Formula for counting number of trees. Spanning trees of a connected graph, Depth first

search (DFS) and Breadth first search (BFS) Algorithms, Minimal spanning tree, Shortest path

problem, Kruskal’s Algorithm, Prim’s Algorithm, dijkstra’s Algorithm. Chinese Postman

Problem.

UNIT-III Coloring of Graphs : Vertex coloring : proper coloring, k-colorable graphs, chromatic number,

upper bounds, Cartesian product of graphs, Structure of k-chromatic graphs, Mycielski’s

Construction, Color-critical graphs, Chromatic Polynomial, Clique number, Independent (Stable)

set of vertices, Independence number, Clique covering, Clique covering number. Perfect graphs :

Chordal graphs, Interval graphs, Transitive Orientation, Comparability graphs. Edge-coloring,

Edge-chromatic number, Line Graphs.

References :

1. Introduction to Graph Theory, Douglas B. West, Prentice-Hall of India Pvt. Ltd.,

New Delhi 2003.

2. Graph Theory, F. Harary, Addison-Wesley, 1969.

3. Basic Graph Theory, K.R. Parthasarathi, Tata McGraw-Hill Publ. Co. Ltd., New

Delhi, 1994.

4. Graph Theory Applications, L.R. Foulds, Narosa Publishing House, New

Delhi,1993.

5. Graph Theory with Applications, J.A. Bondy and U.S.R. Murty, Elsevier science,

1976.

10. Graph Theory with Applications to Engineering and Computer Science, Narsingh

Deo, Prentice-Hall of India Pvt.Ltd., New Delhi, 1997

22

Paper - V (M 2.3.15)

C: Numerical Solution of

Differential and Integral Equation - I

(Elective-II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Numerical methods for ordinary differential equation: Existence, uniqueness and stability

theory, Euler’s method, multistep methods, midpoint methods, Trapezoidal method, low-order

predictor-corrector algorithm, derivation of higher order multistep methods, convergence and

stability for multistep methods.

Unit - II 13 Marks

Numerical Integration: Corrected Trapezoidal rule and its error formula, Peano kernel error

formulas, Newton- Cotes integration formulas, Gaussian quadrature, asymptotic error formulas

and their applications.

Unit - III

Integral equation: Volterra integral equation, Fredholm integral equation, singular integral

equation, non-linear integral equation, convolution integral, differentiation of a function under an

integral sign, relation between differential and integral equation.

Books Prescribed:

1.An introduction to Numerical Analysis (2nd Edition) –Kendall E Atkinson (Wiley)

Chapter 6(6.1-6.8), 5(5.1-5.4).

2. Integral Equations - Shanti Swarup (Krishna Prakashan)

Chapter 1(1.1-1.3).

23

Paper – V (M 2.3.15)

D - Design and Analysis of Algorithms – I

(Elective -II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Mathematical Foundations - Growth functions, summations and recurrences - substitution,

iteration and master methods, counting and probability, amortized analysis.

Sorting - Heap sort, quick, merge sort, sorting in liner time, median and order statistics.

Unit - II 13 Marks

Advanced Data Structures -B- trees, red-black trees, hashing, dynamic order statistics, binomial

and fibonacci heap, disjoint sets.

Unit - III 13 Marks

Dynamic Programming - Matrix chain multiplication, longest common subsequence, optimal

polygon triangulation. Greedy Algorithms - Huffman coding and task scheduling

Problems Graphs - Traversal, topological sort, minimum spanning trees, single source shortest

paths Dijkstra’s and Bellman Ford algorithms, all-pairs shortest path, maximum flow problems.

Book Prescribed:

Introduction to Algorithms, Prentice Hall of India – TH Core man, C.E. Leiserson, R.L. Rivest.

Books Recommended: 1. Computer Algorithms, Introduction to Design and Analysis Addision Wesley - S. Basse, AV.

Gelger

2. Algorithms, Addison Wesley - S. Sadgeerick

3. Designing Efficment Algorithms for Parallel computers - M T Quinn.

24

Paper – V (M 2.3.15)

E - Number Theory and Cryptography – I

(Elective -II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Some Topics in Elementary Number Theory Divisibility and the Euclidean algorithm

congruence’s, some applications to factoring.

Unit - II 13 Marks

Finite Fields and Quadratic Residues Finite fields, Quadratic residues and reciprocity.

Unit - III 13 Marks

Cryptography Same simple cryptosystem Enchiphering matrices

Book Prescribed:

A Course in Number Theory and cryptography (Second Edition) Springer - Neal Koblitz

Chapter -I (2,3,4), II, III

25

Fourth Semester Paper - I (M 2.4.16)

Differential Geometry

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Topological manifold, cutting and pasting abstract manifolds, The space of tangent vectors at a

point of Rn,

Inverse function theorem. Another definition of Ta (Rm

), vector fields on open

subsets of Rn.

Unit - II 13 Marks

Differentiation on differential manifolds, The tangent space at a point of a manifold, vector

fields, Tangent co-vectors, Bilinear forms, Riemann manifold as metric space.

Unit - III 13 Marks

Tensor field, multiplication of Tensors, Exterior differentiation, Differentiation of vector fields

on sub manifolds of Rn, Differentiation on Riemann manifolds.

Book Prescribed :

An introduction to Differentiable manifolds and Riemannian Geometry by William Boothby,

Academic Press, New York.

Unit –I: Chapter I (3,4,5), II (3,4,5,6)

Unit –II: Chapter III (1), IV (1,2), V (1,2,3)

Unit –III: Chapter V (5,6,8), VII (2,3)

26

Paper - II (M 2.4.17)

Calculus in Vector Spaces

FM – 40 + 10 Time : 3 Hrs.

Unit-I

Functions on n-space:

Partial derivatives, Differentiability and the Chain Rule, potential function, curve integrals,

Taylor series, maxima and derivatives.

Unit-II

Derivatives in Vector Space:

The space of Continuous linear maps, The derivative as a lines map, Properties of the derivative,

Mean value Theorem, the second derivative, Higher derivative and Taylor`s formula, Partial

derivatives, Differentiating under the integral sign.

Unit-III

Inverse Mapping Theorem and Ordinary Differential Equation:

The Shrinking Lemma, Inverse mappings, linear case, The inverse mapping theorem, Implicit

function theorem and charts, Local existence and uniqueness, Approximate solutions, linear

differential equations, Dependence on initial Conditions.

Book of Prescribed :

Undergraduate Analysis-S. Lang (Springer &Verlag)

Chapters: 15(15.1-15.6), 16(16.1-16.8), 17(17.1-17.5), 18(18.1-18.4)

27

Paper - III (M.2.4.18)

Operator Theory

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Spectral Theory in dimensional normed spaces: Basic concepts, Spectral properties of Bounded

linear operators, Further properties of resolvent and spectrum, Banach algebra, Further properties

of Banach Algebra.

Unit - II 13 Marks

Compact linear operator on normed spaces, Further properties of compact linear operators,

Spectral properties of compact linear operators, Spectral properties of Bounded

Self Adjoint linear operators, Further spectral properties of Bounded Self Adjoint linear

operators.

Unit - III 13 Marks

Positive operators, Projection operators, Unbalanced linear operators and their Hilbert Adjoint

operators, Hilbert Adjoint operators, Symmetric and Self-Adjoint linear operators, Closed linear

operators and closures, Spectral properties of Self-Adjoint linear operators.

Book prescribed:

Introductory Functional Analysis with Applications-Erwin Kreyszig

Chapter 7(7.1-7.7), 8(8.1-8.3), 9(9.1-9.3, 9.5), 10(10.1-10.4).

28

Paper - IV (M.2.4.19)

A- Computational Finance-II

(Elective-I)

FM – 40 + 10 Time : 3 Hrs.

UNIT-I 13marks

Exotic and Path dependent options, Introduction, Barrier options, Asian options, Look back

options, computational Schemes, option on stock indices, Currencies and futures.

UNIT-II 14marks

Extensions of Black-Scholes model- Limitations of Black-Scholes model, Discrete Hedging,

Transaction costs, volatility smiles, stochastic volatility, Jump diffusion, dividend modeling,

pricing models for multi-asset options.

UNIT-III 13marks

Interest rates and their derivatives: Fixed income products and analysis (yield , duration and

convexity), swaps, one factor and multi-factor interest rate models, interest rate derivatives,

Heath-Jarrow-Merton model

Risk measurement and management, Portfolio management, value at risk, credit risk, credit

derivatives, risk metrics and credit metrics.

Books recommended:

1. J Bax and G Chacko- Financial derivatives: Pricing, applications and Mathematics-

Cambridge University Press, 2004.

2. Y.K. Kwok- Mathematical Models for financial derivatives-Springer Verlang

3. J.C. Hull-Options, Futures and other derivatives- Prentice Hall of India, 2003

29

Paper - IV (M 2.4.19)

B- Theory of Computation - II

(Elective - I)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

The Turing machine, Programming techniques for Turing machines, Extensions to the basis

Turing machine, Restricted Turing machines, Turing machines and computers.

Unit - II 13 Marks

Non - Recursively emmerable languages, undecidable problem that is recursively enumerable

undecidable problems about Turing machines. Post’s correspondence problems, other

undecidable problems.

Unit - III 13 Marks

Mapping Reducibility, Measuring complexity, The Class P & the class NP.

Books Recommended:

1. J. E. Hopcroft, R. Motwani, J. D. Ullman - Introduction to Automata theory, Languages and

Computation, 2nd Edition, Pearson Education, 2001

2. M. Sipser - Introduction to Theory of Computation Thomson Leamings.

3. R. Greenlan, H. J. Hooer - Fundamentals of the Theory of Computation, Principles and

Practice - Harcourt India Pvtt.

4. Peter Linz - An Introduction to Formal Languages & Automata, Narsora Publising House,

1998.

30

Paper – IV (M 2.4.19)

C - Operation Research - II

( Elective - I )

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Non - linear programming and methods

Unit - II 13 Marks

Non linear programming methods (contd.), Quadratic programming (Wolfe’s and Beale’s

Method), Separable convex programming, Separable programming algorithm.

Unit - III 13 Marks

Geometric Programming - Goal Programming

Book Prescribed :

Operation Research (Ninth Edn. 2001) - Kanti Swarup, P. K. Gupta, Manmohan (S. Chand)

Chapter 24, 25(25.8), 26(26.1-26.6)

31

Paper - IV (M 2.4.19)

D- Fractals - II

( Elective -I)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Fracta Interpolation.

Unit - II 13 Marks

Julia sets.

Unit - III 13 Marks

Parameter spaces and Mandelbrot sets.

Book Recommended:

Fractals Everywhere - Michael F. Bamslury

32

Paper - IV (M 2.4.19)

E- Fuzzy sets and their applications-II

( Elective -I)

UNIT-I

Fuzzy Logic and Approximate reasoning: Linguistic variables, Fuzzy logic, Truth tables and

Linguistic approximation, approximate reasoning, fuzzy languages

UNIT-II

Decision making in fuzzy environments: Fuzzy decisions, fuzzy linear programming, symmetric

fuzzy LP, Fuzzy dynamic programming

UNIT-III

Fuzzy set models in Operations Research: Introduction, fuzzy set models in Logistics, fuzzy

approach to transportation problems, fuzzy linear programming in logistics, fuzzy set decision

model as optimization criterion, and other associated models

Books Prescribed:

1. Fuzzy set theory and its application allied publisher rd New Delhi - 1991 - U. Z. Zimmermann

2. Fuzzy set and fuzzy logic prentice Hall of Indi New Delhi 1995- G J Klir & Bo Yuan

33

Paper - V (M 2.4.20)

A- Fluid Dynamics - II

(Elective - II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Exact solutions of Navier – Stokes Equations .

Unit - II 13 Marks

Theory of Laminar Boundary Layers

Unit - III 13 Marks

Integral methods for the Approximate solution of laminar Boundary Layer equations, thermal

Boundary Layers in Two – Dimensional Flow.

Book Prescribed:

Viscous Fluid Dynamics – J. L .Bansal, Oxford 7 IBH Publishing Co.

Chapter 4(4.8-4.13), 6(6.1-6.4), 7(7.1-7.4), 8(8.1,8.2).

------------------------------------------------------------------------------------------------------------

34

Paper - V (M 2.4.20)

B- Graph Theory II

(Elective - II)

FM – 40 + 10 Time : 3 Hrs

UNIT-I 14marks

Planarity of Graphs : Drawing graphs in a plane, Planar Graphs, Planar embeddings, Dual

Graphs, Euler’s Formula, Maximal Planar Graphs. Subdivisions, Kuratowski’s Theorem, Convex

Embedding. Planarity Testing Algorithm. Coloring of planar graphs, Edge-contraction, Five

color theorem, Kempe’s chain, Four Color Theorem (Statement only). Crossing Number.

UNIT-II 13marks

Directed Graphs : Definitions and examples, Vertex degrees, Eulerian Digraphs, Orientations

and Tournaments, Network and Flow problem, Max Flow – Min Cut Theorem, Algorithm for

finding maximum flow.

UNIT-III 13marks

Matching : Maximum Matching Problem, Hall’s Marriage Theorem, Minimum covering

problems : Vertex Cover, Konig-Egervary Theorem, Edge Cover and its characterization in

terms of independence number.

Books for References :

1. Introduction to Graph Theory, Douglas B. West, Prentice-Hall of India Pvt. Ltd.,

New Delhi 2003.

2. Graph Theory, F. Harary, Addison-Wesley, 1969.

35

Paper - V (M 2.4.20)

C: Numerical Solution of Differential and Integral Equation – II

(Elective-II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Numerical solution of ordinary differential equations by boundary value problems.

Numerical solution of partial differential equations by finite difference methods.

Unit - II 13 Marks

Finite Element method.

Unit - III 13 Marks

Solution of integral equations.

Books Prescribed :

1. Introductory methods of Numerical Analysis S. S. Sastry (PHI)

Chapter 7(7.10), 8, 10.

2. Integral Equations - Shanti Swarup (Krishna Prakashan)

Chapter 2(2.1-2.9)

36

Paper - IV (M 2.4.20)

E - Number Theory and Cryptography - II

( Elective - II)

FM – 40 + 10 Time : 3 Hrs.

Unit - I 14 Marks

Public Key, the idea of public key cryptography, RSA, Discrete log, knapsack.

Unit - II 13 Marks

Primality and factoning, pseudo primes, the rho method, Format factorization and factor bases,

continued fraction method.

Unit - III 13 Marks

Elliptic curves, Basic facts, Elliptic curve cryptosystem, Elliptic curve primality test

Books Prescribed :

A course in Number Theory and Cryptography - Neal Koblitz (Springer)

Chapter IV (1,2,3,4), V (1,2,3,4), VI (1,2,3)