UNIT-II: Transportation and Assignment Problems                                    (15 Hours)

               Definition of transportation problem, finding initial basic feasible solution using Northwest corner
               method, Least-cost method, and Vogel approximation method; Algorithm for solving
               transportation problem; Hungarian method of solving assignment problem.

               UNIT-III: Two-Person Zero-Sum Games                                                (12 Hours)
               Introduction to game theory, rectangular games, Mixed strategies, Dominance principle;
               Formulation of game to primal and dual linear programming problems.

               *TUTORIAL (15 Hours (1 Hour per week))

               SUGGESTED READINGS:


                   1.  Thie, Paul R., & Keough, G. E. (2014). An Introduction to Linear Programming andGame
                       Theory. (3rd ed.). Wiley India Pvt. Ltd.
                   2.  Taha, Hamdy A. (2017). Operations Research: An Introduction (10th ed.). Pearson.
                   3.  Hadley, G. (1997). Linear Programming. Narosa Publishing House. New Delhi.
                   4.  Hillier,  F.  S.,  &  Lieberman,  G.  J.  (2021).  Introduction  to  Operations  Research  (11th
                       ed.)McGraw-Hill Education (India) Pvt. Ltd.


               Math.323                   Complex Analysis                                              3+1*

               LEARNING OBJECTIVES:

               The primary objective of this course is:
                     To study the techniques of complex variables and functions together with their derivatives,
                       Contour integration and transformations.
                     To study complex power series, classification of singularities, calculus of residues and its
                       applications in the evaluation of integrals, and other concepts and properties.

               LEARNING OUTCOMES:


               This course will enable the students to: S
                     Understands  the  fundamental  concepts  of  complex  variable  theory  and  skill  of  contour
                       integration to evaluate complicated real integrals via residue calculus.
                     Apply problem-solving using complex analysis techniques applied to diverse situations in
                       physics, engineering, and other mathematical contexts.

               THEORY (45 Hours)

               UNIT I                                                                             (15 Hours)

               Limits, Limits involving the point at infinity, continuity. Properties of complex numbers, regions
               in  the  complex  plane,  functions  of  complex  variable,  mappings.  Derivatives,  differentiation
               formulas, Cauchy-Riemann equations, sufficient conditions for differentiability.

               UNIT-II                                                                            (15 Hours)
               Analytic functions,  examples of analytic functions, exponential function, Logarithmic function,
               trigonometric function, derivatives of functions, definite integrals of functions.
               UNIT-III                                                                           (15 Hours)

               Contours,  Contour  integrals  and  its  examples,  upper  bounds  for  moduli  of  contour  integrals.
               Cauchy-  Goursat  theorem,  Cauchy  integral  formula.  Liouville‘s  theorem  and  the  fundamental
               theorem of algebra. Convergence of sequences and series, Taylor series and its examples.


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