Syllabus for MAT 240 – Algebra I
This is a compulsory course for BS Mathematics students in their 3rd semester.
Credits
(Lec:Tut:Lab)=
3:1:0 (3 lectures and 1 tutorial weekly)
Overview:
Learning traditional Abstract Algebra in a contemporary style. The
course will cover the standard algebraic structures of groups, rings
and fields up to the Fundamental Theorem of Algebra.
Detailed
Syllabus:
Module I: Groups
- Definition and examples, abelian and non-abelian groups, finite and infinite groups
- Subgroups: characterisations, subgroup generated by a subset, commutator subgroup, center
- Cyclic Groups: Properties, classification of subgroups
- Permutation Groups: definition and notation, examples, properties, Symmetric group on n letters (Sn), Alternating group (An) on n letters
- Cosets and Lagrange's theorem
- External Direct Product: Definition and examples, properties, criteria for external direct product to be cyclic, finitely generated abelian groups
Module II: Morphisms
- Normal subgroups, factor groups, internal direct products
- Group homomorphism: Definition and examples, properties
- Isomorphism, First Isomorphism Theorem, automorphism, properties, examples
Module
III: Rings
- Introduction to Rings: Definition, examples, properties
- Subrings
- Ideals, factor rings, prime ideals and maximal ideals
- Polynomial Rings: Notation and terminology, division algorithm
Module IV: Extension Fields
- Integral Domain, definitions and examples, Fields, Characteristic
- Examples of Fields, algebraic and transcendental elements, degree of a field extension
- Finite Fields: examples, Fundamental Theorem of Algebra
Main
Reference:
- Contemporary Abstract Algebra by Joseph A. Gallian, 4th edition. Narosa, 1999.
Other
References:
- Topics in Algebra by I.N. Herstein, 2nd Edition. Wiley India, 2006.
- Algebra by Michael Artin, 2nd Edition. Prentice Hall India, 2011.
- A First Course in Abstract Algebra by John B. Fraleigh, 7th Edition. Pearson, 2003.
- Undergraduate Algebra by Serge Lang, 2nd Edition. Springer India, 2009.
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