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better, and classify them as abelian, cyclic and permutation groups.
Explain the significance of the notion of cosets, normal subgroups and homomorphisms.
Understand the fundamental concepts of rings, subrings, fields, ideals, and factor rings.
THEORY (45 Hours)
UNIT-I: Introduction to Groups (12 Hours)
Modular arithmetic; Definition and examples of groups, Elementary properties of groups, Order
of a group and order of an element of a group; Subgroups and its examples, Subgroup tests;
Center of a group and centralizer of an element of a group.
UNIT-II: Cyclic Groups, Permutation Groups and Lagrange’s Theorem (18 Hours)
Cyclic groups and its properties, Generators of a cyclic group; Group of symmetries; Permutation
groups, Cyclic decomposition of permutations and its properties, Even and odd permutations and
the alternating group; Cosets and Lagrange‘s theorem; Definition and examples of normal
subgroups, Quotient groups; Group homomorphisms and properties.
UNIT-III: Rings, Integral Domains, and Fields (15 Hours)
Definition, examples and properties of rings, subrings, integral domains, fields, ideals and factor
rings; Characteristic of a ring; Ring homomorphisms and properties.
*TUTORIAL (15 Hours (1 Hour per week))
SUGGUESTED READINGS:
1. M.Artin,AbstractAlgebra,2ndEd.,Pearson,2011.
th
2. JosephAGallian,ContemporaryAbstractAlgebra,4 Ed.,Narosa,1999.
3. GeorgeEAndrews,NumberTheory,HindustanPublishingCorporation,1984.
4. I.N. Herstein: ―Topics in Algebra‖, Wiley Eastern Company, New Delhi, 1975.
nd
5. Hoffman and R. Kunze; Linear Algebra, 2 Edition, Prentice Hall of India, Delhi.
6. Vivek Shahi and Vikas Bisht: Algebra, Narosa Publishing House.
nd
7. P.B. Bhattacharya, S.K. Jain and S.R. Nagpaul; Basic Abstract Algebra (2 Edition)
8. Spectrum- Abstract Algebra, Sharma Publications, Jalandhar
9. A Text Book of Abstract Algebra, S. Dinesh & Co, Jalandhar
Maths.311 Elementary Linear Algebra 3+1*
LEARNING OBJECTIVES:
The objective of the course is:
To introduce the concept of vectors in .
Understanding the nature of solution of system of linear equations.
To view the × matrices as a linear function from to and vice versa.
To introduce the concepts of linear independence and dependence, rank and linear
transformations has been explained through matrices.
LEARNING OUTCOMES:
This course will enable the students to:
Visualize the space in terms of vectors and the interrelation of vectors with
matrices.
Familiarize with concepts of bases, dimension, and minimal spanning sets in vector
spaces.
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