Details for Course FMAN65F Mathematical Structures

Current Established Course Syllabus

General

Aim

Besides mere knowledge imparting, the course aims to give training in theorem proving, and to bring out the possibilities of a more abstract representation of mathematical concepts and the connections between them. The intention is to give an overall view elucidating the foundations of the mathematical theories in the basic courses.

Contents

Sets. Real numbers. Metric spaces. Algebra (groups and linear spaces). Banach spaces and Hilbert spaces with applications.

Knowledge and Understanding

For a passing grade the doctoral student must
be familiar with and in his or her own words be able to explain the concepts within analysis, algebra and geometry touched upon in the course.

be able to give examples of how these concepts are abstractions of concepts in the basic courses, and show understanding for how the abstractions serve to simplify and clarify the theory.

in his/her own word be able to describe the logical connections between the concepts (theorems and proofs).

Competences and Skills

Judgement and Approach

Types of Instruction

Examination Formats

Written exam
Oral exam
Comments:
The examiner, in consultation with Disability Support Services, may deviate from the regular form of examination in order to provide a permanently disabled student with a form of examination equivalent to that of a student without a disability.
Grading scale:
Failed, pass

Admission Requirements

Assumed Prior Knowledge

Selection Criteria

Literature

Literature:
Kaplansky, I.: Set Theory and Metric Spaces. American Mathematical Society. 2001. ISBN 9780821826942.

Further Information

Course code

Administrative Information

1 course syllabus.

Valid from	First hand in	Second hand in	Established
Spring 2023	2023‑01‑04 16:59:49	2023‑01‑05 10:04:06	2023‑01‑14

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