Commutative Algebra - University of Gothenburg Till startsida
Sitemap
To content Read more about how we use cookies on gu.se

Commutative Algebra

Master's level | 7.5 credits | Course code: MMA330
Autumn 2018
50% Day
Göteborg
Period: 3 September 2018 - 4 November 2018
INSTRUCTION LANGUAGE: English
2 Closed GU-11755
2) Only EU/EEA citizens and students with approved residence permit in Sweden can apply

About the Course

In this course you will study structural theorems for commutative rings, with applications in algebraic geometry, algebraic number theory, and complex analysis. To construct and study new commutative rings from known ones, you will look at polynomials, fractions, and congruences. We introduce a concept of dimension for commutative rings and relate it to the transcendence degree of extension fields. Finally, you will study Dedekind rings and (if we have time) p-adic numbers. The course is one of the first you will take as a graduate student in mathematics.

More Information

http://www.chalmers.se/sv/in...

Show more

Course Syllabus

MMA330

Requirements and Selection

Requirements: Knowledge equivalent to 90 credits in mathematics, including the course MMG500 Algebraic Structures.

Selection: All eligible applicants who have applied before the deadline will be granted a place.

Tuition Fee

Application fee: 900 SEK
Full course cost: 14 375 SEK
First payment: 14 375 SEK

EU/EEA citizens, Swedish residence permit holders and exchange students do not pay fees. More information on: http://www.universityadmissions.se

Study Guidance

svl.math@gu.se, tel: 031-772 3505

Department

Department of Mathematical Sciences
41296 Göteborg

Visiting address: Chalmers Tvärgata 3

Phone: 0317721000

Page Manager: Webmaster
Last update: 6/15/2018 12:12 PM

Tell a friend about this page
Print version

Page Manager: Webmaster|Last update: 10/16/2018
Share:

The University of Gothenburg uses cookies to provide you with the best possible user experience. By continuing on this website, you approve of our use of cookies.  What are cookies?