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Course Detail

Course Name Advanced Mathematical Foundation
Course Code 25MAT139
Program M. C. A., B.C.A. (Honours)
Credits 3
Campus Kochi , Amritapuri

Syllabus

Unit 1

Relations and Their Properties – Representing Relations, Closure of Relations, Partial Ordering, Equivalence Relations and partitions, Functions- definition, types, and composition.

Unit 2

Advanced Counting Techniques and Relations – Recurrence Relations, Generating Functions, solving linear Recurrence Relations, Divide and Conquer algorithm, Inclusion-Exclusion.

Unit 3

Graph Theory – Graphs and subgraphs, isomorphism, matrices associated with graphs, degrees, walks, connected graphs, shortest path algorithm, Euler and Hamilton Graphs: Euler graphs, Euler’s theorem, Hamilton cycles, Chinese-postman problem, approximate solutions of traveling salesman problem.

Unit 4

Definition of Groups, Basic Examples – Symmetric Groups, Matrix Groups, Subgroups, Cyclic Group, and Factor Groups; Lagrange’s Theorem; Normal Subgroups; Quotients of Groups.

Unit 5

Linear Transformations, Eigen values and vectors, Diagonalization, Orthogonal Diagonalization, Inner Products, Angle and Orthogonality in Inner Product Spaces, Length of a Vector, Orthogonal Vectors, Orthogonal Complement.

Objectives and Outcomes

Objective:

  • Learn different types of relations, functions, and their properties.
  • Familiarize yourself with the advanced counting techniques and graph theory.
  • Understand the fundamentals of group theory.
  • Learn to implement the concepts of linear transformation, eigenvalues, diagonalization, inner product space, and orthogonality.

Course Outcomes:

COs Description
CO1 Implement various relations, functions, and their properties.
CO2 Solve linear recurrence relations using the divide and conquer algorithm and inclusion-exclusion principle.
CO3 Determine the basic characteristics of graph theory and its real-life applications.
CO4 Develop the concepts of group theory.
CO5 Implement linear transformation rules, diagonalization, and the concept of inner product spaces.

CO-PO Mapping

PO  

PO1

  

PO2

  

PO3

 PO4 PO5 PO6 PO7 PO8 PO9 PO10 PO11 PO12
CO
CO1 3 3 3 3 2 1 1
CO2 3 3 3 3 2 1 1 1
CO3 3 3 3 3 2 1 1 1
CO4 3 3 3 2 1 1 1
CO5 3 3 3 2 2 1 1

Textbooks /References

Textbooks:

  1. Kenneth H. Rosen, “Discrete Mathematics and its Applications”, Tata McGraw- Hill Publishing Company Limited, New Delhi, Sixth Edition, 2007.
  2. I N. Herstein, ‘Topics in Algebra’, Second Edition, John Wiley and Sons, 2000.
  3. Gilbert Strang,’ Linear Algebra and its Applications, Fourth Edition, Cengage Learning, 2014
  4. Howard Anton and Chris Rorres, ‘Elementary Linear Algebra’, 9th Edition, Wiley, 2005.

References:

  1. P. Grimaldi, “Discrete and Combinatorial Mathematics”, Pearson Education, Fifth Edition, 2007.
  2. Liu, “Elements of Discrete Mathematics”, Tata McGraw- Hill Publishing Company Limited, 2004.
  3. John B. Fraleigh, ‘A First Course in Abstract Algebra’, Narosa Publishing House, 2003.

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