Foundations of Combinatorics and Graph Theory - NMIN331
Title: Základy kombinatoriky a teorie grafů
Guaranteed by: Department of Applied Mathematics (32-KAM)
Faculty: Faculty of Mathematics and Physics
Actual: from 2022
Semester: summer
E-Credits: 5
Hours per week, examination: summer s.:2/2, C+Ex [HT]
Capacity: unlimited
Min. number of students: unlimited
4EU+: no
Virtual mobility / capacity: no
State of the course: taught
Language: Czech
Teaching methods: full-time
Guarantor: doc. RNDr. Pavel Valtr, Dr.
Teacher(s): prof. RNDr. Jan Kratochvíl, CSc.
doc. RNDr. Pavel Valtr, Dr.
Class: M Bc. MMIB
M Bc. MMIB > Doporučené volitelné
M Bc. OM
M Bc. OM > Zaměření MSTR
M Bc. OM > Povinně volitelné
Classification: Informatics > Discrete Mathematics
Mathematics > Discrete Mathematics
Incompatibility : NDMA001
Interchangeability : NDMA001
Is interchangeable with: NDMA001
In complex pre-requisite: NMAG351
Opinion survey results   Examination dates   Noticeboard   
Annotation -
Basics of graph theory and systems of sets. Recommended for specialization Mathematical Structures within General Mathematics and for bachelor's program in Information security.
Last update: G_M (16.05.2012)
Course completion requirements -

The credit for the exercise is given after obtaining at least 20 points for solving home problems, which is roughly a quarter of all points that can be obtained. The deadline for solutions is approximately until the end of the semester and it is possible to hand in the solutions repeatedly, only the best solutions are counted in for each problem. The nature of the conditions does not allow repeated attempts for obtaining the credit. Obtaining the credit is necessary before the exam.

Last update: Kratochvíl Jan, prof. RNDr., CSc. (18.02.2018)
Literature -

Literature according to the recommendation of the teacher.

Last update: Hladík Milan, prof. Mgr., Ph.D. (17.04.2013)
Requirements to the exam -

The exam is oral. The knowledge and skills examined correspond to the sylabus in extent presented during the lectures. Common understanding to all notions and their relationship, theorems including proofs and ability to apply the aquired skills to simple situations related to the topics of the class are subject of the examination. Credit from the recitations must be obtained prior to enroling to an exam.

Last update: Kratochvíl Jan, prof. RNDr., CSc. (18.02.2018)
Syllabus -

Overview of basics of computational complexity and NP-completeness. Inclusion-exclusion principle and its applications. Generating functions. Finite projective planes, latin squares. Hall theorem and its applications. Flows in digraphs. k-connectivity of graphs. Ramsey theory.

Last update: G_M (16.05.2012)