The fundamental theorem of arithmetics, the Euclidian algorithm and a Diophantine equation. Modular arithmetics, Fermat's theorem and RSA. Functions, infinite sets and cardinal numbers. Elementary group theory, the theorem of Langrange, the symmetrical group and the lemma of Burnside. Error correcting codes, Hamming codes. Generating functions and partitions of integers. Combinatorics, multinomial numbers, Stirling numbers, the sieve principle and the Moebius inversion formula. Elementary graph theory, coloring problems, matchings in bipartite graphs, flows and cuts.
SF2736 Discrete Mathematics 7.5 credits
This course has been discontinued.
Last planned examination: Autumn 2018
Decision to discontinue this course:
No information insertedContent and learning outcomes
Course contents
Intended learning outcomes
The overall goal is to give basic knowledge in Discrete mathematics, in particular a good knowledge in elementary combinatorics, knowledge of some abstract algebraic structure and the use of it, and knowledge of some selected topics in graph theory.
After the course it is expected that the student will have achieved a better ability for treating and applying mathematics in general.
Literature and preparations
Specific prerequisites
Elementary linear algebra, for example SF1604.
Recommended prerequisites
Equipment
Literature
Biggs: Discrete Mathematics, 2:nd ed.
Examination and completion
If the course is discontinued, students may request to be examined during the following two academic years.
Grading scale
Examination
- TEN1 - Examination, 7.5 credits, grading scale: A, B, C, D, E, FX, F
Based on recommendation from KTH’s coordinator for disabilities, the examiner will decide how to adapt an examination for students with documented disability.
The examiner may apply another examination format when re-examining individual students.
TEN1-written examination, 7.5 hp, Grades A-F.
Opportunity to complete the requirements via supplementary examination
Opportunity to raise an approved grade via renewed examination
Examiner
Ethical approach
- All members of a group are responsible for the group's work.
- In any assessment, every student shall honestly disclose any help received and sources used.
- In an oral assessment, every student shall be able to present and answer questions about the entire assignment and solution.
Further information
Course room in Canvas
Offered by
Main field of study
Education cycle
Add-on studies
Supplementary information
The course is replaced by SF1679.