  Understand the methods to reduce Initial value problems associated with linear differential
                       equations to various integral equations.
                     Categorize and solve different integral equations using various techniques.
                     Solve the singular integral equations and derivation of Hilbert-Schmidt theorem.
                     Know the variational problems, extremum of a functional and necessary conditions for the
                       extremum of a functional.


               THEORY (45 Hours)

               UNIT I:                                                                            (15 Hours)
               Integral  Equations  Definitions  of  Integral  Equations  and  their  classification,  Eigen  values  and
               Eigen  functions.  Reduction  to  a  system  of  algebraic  equations,  An  Approximate  Method.
               Fredholm  Integral  equations  of  the  first  kind.  Method  of  Successive  Approximations  Iterative
               Scheme for Volterra and Fredholm Integral equations of the second kind. Conditions of uniform
               convergence and uniqueness of series solution. Resolvent kernel and its results. Application of
               iterative Scheme to Volterra integral equations of the Second kind. Classical Fredholm Theory
               Method of solution of Fredholm equations, Fredholm Theorems
               UNIT II:                                                                           (15 Hours)

               Symmetric  Kernels  Introduction  to  Complex  Hilbert  Space,  Orthonormal  system  of  functions,
               Riesz-Fischer  Theorem,  Fundamental  properties  of  Eigen  values  and  Eigen  functions  for
               symmetric kernels, Expansion in Eigen function and bilinear form, Hilbert Schmidt Theorem and
               some immediate consequences, Solutions of integral equations with symmetric kernels. Singular
               Integral Equations The Abel integral equation, Cauchy principal value for integrals, Cauchy-type
               integrals, singular integral equation with logarithmic kernel, Hilbert- kernel, solution of Hilbert-
               type singular integral equation

               UNIT III:                                                                          (15 Hours)
               Calculus  of  Variations  Variational  problems,  the  variation  of  a  functional  and  its  properties,
               Extremum  of  a  functional,  Necessary  condition  for  an  extremum,  Euler‘s  equation  and  its
               generalization,  Variational  derivative,  General  variation  of  a  function  and  variable  end  point
               problem.

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


               SUGGESTED READINGS:

                   1.  R.P.  Kanwal,  Linear  Integral  Equation.  Theory  and  Techniques,  Academic  Press,  New
                       York, 1971.
                   2.  S.  G.  Mikhlin,  Linear  Integral  Equations  (translated  from  Russian)  Hindustan  Book
                       Agency, 1960
                   3.  J.M. Gelfand and S.V. Fomin, Calculus of Variations, Prentice Hall, New Jersy, 1963.
                   4.  M.  D.  Raisinghania,  Integral  Equations  &  Boundary  Value  Problems,  Sultan  Chand  &
                       Sons.

               Math.425                   Operational Research                                          3+1*


               LEARNING OBJECTIVES:

               The primary objective of this course is to introduce:
                     The history and applications and uses of OR techniques in decision making. The convex
                       set  theory  to  find  the  optimal  Basic  feasible  solution  of  LPP.  Modelled  the  real-world




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