- 1
- 12 weeks long
- Swayam
- English
Course Overview
This is an introductory course in Commutative Algebra where most basic tools on commutative rings and modules over commutative rings are developed. This course is essential for anyone who wants to do research in areas such as commutative algebra, algebraic geometry, algebraic number theory etc.
INTENDED AUDIENCE : M.Sc. & Ph.D. Mathematics Students.PRE-REQUISITES : Linear Algebra, Basic group theory and Basic ring theory including ED, PID & UFD.
INTENDED AUDIENCE : M.Sc. & Ph.D. Mathematics Students.PRE-REQUISITES : Linear Algebra, Basic group theory and Basic ring theory including ED, PID & UFD.
Course Circullum
COURSE LAYOUT
MODULE 1 : Rings, ring homomorphism, ideals, quotients, zero divisors, nilpotents and units.MODULE 2: Prime and maximal ideals, nilradical and Jacobsons radicalMODULE 3: Operations on ideals, extension and contraction.MODULE 4: Modules and module homomorphisms, Submodules and quotient modules, Operations on submodules, Direct sum and productMODULE 5: Finitely generated modules, Exact sequences, Tensor product of modules.MODULE 6: Restriction and extension of scalars, Exactness properties of the tensor product.MODULE 7: LocalizationMODULE 8: Integral dependence, Going-up and Going-down theorems.MODULE 9: Chain conditions, Noetherian ringsMODULE 10: Primary decomposition in Notherian rings.MODULE 11: Artinian ringsItem Reviews - 3
Submit Reviews
This Course Include:
COURSE LAYOUT
MODULE 1 : Rings, ring homomorphism, ideals, quotients, zero divisors, nilpotents and units.MODULE 2: Prime and maximal ideals, nilradical and Jacobsons radicalMODULE 3: Operations on ideals, extension and contraction.MODULE 4: Modules and module homomorphisms, Submodules and quotient modules, Operations on submodules, Direct sum and productMODULE 5: Finitely generated modules, Exact sequences, Tensor product of modules.MODULE 6: Restriction and extension of scalars, Exactness properties of the tensor product.MODULE 7: LocalizationMODULE 8: Integral dependence, Going-up and Going-down theorems.MODULE 9: Chain conditions, Noetherian ringsMODULE 10: Primary decomposition in Notherian rings.MODULE 11: Artinian rings- Provider:Swayam
- Certificate:Paid Certificate Available
- Language:English
- Duration:12 weeks long
- Language CC: