Universität Wien

250124 VO Topics from number theory (2020S)

3.00 ECTS (2.00 SWS), SPL 25 - Mathematik
Moodle

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Details

Language: English

Examination dates

Lecturers

Classes (iCal) - next class is marked with N

Begin: 09.03.2020, i.e. we will start in the second week

Dear Students,

I have opened a moodle account for the course where I ask everyone interested in the course to register.
I will write notes for the first part of course covering the material until Easter which I will upload to moodle.

If you have any questions please do not hesitate to contact me via mail.

Hope to see you well after Easter.

JM

  • Monday 09.03. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 16.03. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 23.03. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 30.03. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 20.04. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 27.04. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 04.05. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 11.05. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 18.05. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 25.05. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 08.06. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 15.06. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 22.06. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock
  • Monday 29.06. 15:00 - 16:30 Seminarraum 9 Oskar-Morgenstern-Platz 1 2.Stock

Information

Aims, contents and method of the course

The lecture course is related to last semster's courses on algebraic function fields but is not a direct continuation. This semester the subject will be the (modern) geometric formulation of the theory of function fields which leads to much wider applicability of the theory. This will be based on the language of schemes whose basic formlaism and properties we will discuss. We will not give full details and proofs and often will omit technical issues. If time permits we would like to discuss Riemann Roch for schemes.

Familiarity with basic algebraic geometry (e.g. some familiarity with algebraic varities or even schemes) will be helpful.

Assessment and permitted materials

Oral exam

Minimum requirements and assessment criteria

To pass the oral exam

Examination topics

Content of the lecture course

Reading list

Association in the course directory

MALV

Last modified: Th 22.10.2020 09:49