Modules and Rings-II
This course will enable the students to -
- Explore a ring is an important fundamental concept in algebra and includes integers, polynomials and matrices as some of the basic examples.
- Analyze the study of modules over a ring R provides students with an insight into the structure of R.
- Develop ring and module theory leading to the fundamental theorems of Wedderburn and some of its applications.
- Explore a module over a ring is a generalization of vector space over a field.
|
Course |
Learning outcomes (vat course level) |
Learning and teaching strategies |
Assessment Strategies |
|
|---|---|---|---|---|
|
Course Code |
Course Title |
|||
|
24MAT 425(C) |
Modules and Rings-II (Theory)
|
CO202: Explain local rings to prove basic properties of formal power series. CO203: Determine semi simple modules and its characterization. CO204: Explain simple ring, characterization of Artinian simple ring. CO205: Analyze basic properties of the Jacobson radical, Jacobson Semisimple Rings, Hopkins-Levitzki Theorem, Nakayama's Lemma and regular ring. CO206: Explore the concept of the lower and upper nil radical of a ring. CO207: Contribute effectively in course-specific interaction.
|
Approach in teaching: Interactive Lectures, Discussion, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, Topic presentation, Assigned tasks |
Quiz, Class Test, Individual projects, Open Book Test, Continuous Assessment, Semester End Examination
|
Local ring, Characterization of local ring, Local ring of formal power series.
Semisimple module, Semisimple ring, Characterizations of semisimple module and semisimple ring Wedderburn-Artin theorem on semisimple ring.
Simple ring, Characterization of Artinian simple ring.
The Jacobson radical, Jacobson radical of matrix ring, Jacobson semisimple ring, Relation between Jacobson semisimple ring and semisimple ring, Hopkins-Levitzki theorem, Nakayama’s lemma, Regular ring, Relation among semisimple ring, Regular ring and Jacobson semisimple ring.
Lower nil radical, Upper nil radical, Nil radical, Brauer’s lemma, Kothe’s conjecture, Levitzki theorem.
- T.S. Blyth, Module Theory, Oxford University Press, London, 1990.
- T.Y. Lam, Noncommutative Rings, Springer-Verlag, 2001.
- I.N. Herstein, Noncommutative Rings, C. The Mathematical Association of America, 2005.
- T.W. Hungerford, Algebras, Springer, 2003.
- B. Hartley, T.O. Hauvkes, Rings, Modules and Linear Algebra, Chapman and Hall Ltd., 1970.
SUGGESTED READING
- R.B. Allenly, Rings Fields and Graphs: An Introduction of Abstract Algebra, Edward Arnold, 1991.
- T.W. Hungerford, Algebras, Springer, 2003.
- J. Rose, A Course on Ring Theory, Cambridge University Press, 1978.
- L.H. Rowen, Ring Theory (Student Addition), Academic Press, 1991.
- N. Jacobson, Structure of Rings, AMS, 1970.
- P.M. Cohn, Basic Algebra, Springer; Corrected 2003, edition 2002.
e- RESOURCES
- https://nptel.ac.in/courses/111106131
- https://nptel.ac.in/courses/111106098
- https://nptel.ac.in/courses/111102009
- http://www.uop.edu.pk/ocontents/Ring%20theory.pdf
JOURNALS
- https://www.sciencedirect.com/journal/journal-of-pure-and-applied-algebra/vol/133/issue/1
- https://www.mdpi.com/journal/symmetry/special_issues/Commutative_Ring_Theory
- https://www.academia.edu/Documents/in/Ring_Theory
