Course Identification

Basic notion in commutative algebra
20184261

Lecturers and Teaching Assistants

Prof. Tsachik Gelander
Dr. Gil Goffer, Elyasheev Leibtag

Course Schedule and Location

2018
First Semester
Tuesday, 13:15 - 16:00, Ziskind, Rm 1

Tutorials
Sunday, 10:15 - 12:00, Goldsmith, Rm 208
29/10/2017

Field of Study, Course Type and Credit Points

Mathematics and Computer Science: Elective; 4.00 points

Comments

* on December 26th the lecture will start at 13:30

Prerequisites

No

Restrictions

60

Language of Instruction

English

Attendance and participation

Expected and Recommended

Grade Type

Numerical (out of 100)

Grade Breakdown (in %)

50%
50%

Evaluation Type

Final assignment

Scheduled date 1

N/A
N/A
-
N/A

Estimated Weekly Independent Workload (in hours)

4

Syllabus

  • Commutative rings
  • Modules
  • Integral Dependence
  • Valuations
  • Noetherian rings
  • Artin rings
  • Discrete Valuation rings and Dedekind rings
  • Completions
  • Dimension theory
  • Zariski topology
  • Introduction to algebraic ge

Learning Outcomes

Upon successful completion of this course students should be able to:

  1. Commutative algebra is a beautiful mathematical theory which form the basic to algebraic number theory as well as algebraic geometry.

Reading List

N/A

Website

N/A