Graph Theory and Applications - P413001
Title: Teorie grafů a její aplikace
Guaranteed by: Department of Mathematics, Informatics and Cybernetics (446)
Faculty: Faculty of Chemical Engineering
Actual: from 2021 to 2022
Semester: both
Points: 0
E-Credits: 0
Examination process:
Hours per week, examination: 3/0, other [HT]
Capacity: winter:unknown / unknown (unknown)
summer:unknown / unknown (unknown)
Min. number of students: unlimited
Language: Czech
Teaching methods: full-time
Teaching methods: full-time
Level:  
For type: doctoral
Note: course is intended for doctoral students only
can be fulfilled in the future
you can enroll for the course in winter and in summer semester
Guarantor: Maxová Jana RNDr. Ph.D.
Is interchangeable with: AP413001
Examination dates   
This subject contains the following additional online materials
Annotation -
Last update: MAXOVAJ (08.06.2018)
The basic concepts of graph theory are introduced. Algorithmic solutions of engineering problems are discussed.
Aim of the course -
Last update: MAXOVAJ (08.06.2018)

Students will acquire the basic concepts of graph theory. They will learn to analyze various engineering tasks and solve them using known graph algorithms. They will then learn how to

recognize computationally hard tasks and gain insight into many of the problems solved by graph theory.

Literature -
Last update: MAXOVAJ (08.06.2018)

A: Matousek J., Nesetril J.: Invitation to Discrete Mathematics, Oxford University Press, USA, 2011. ISBN 978-0198570424

A: West D. B.: Introduction to Graph Theory. Pearson, 2001. ISBN 978-0130144003.

A: Diestel R.: Graph Theory (Graduate Texts in Mathematics). Springer, 2010. ISBN 978-3642142789.

A: Christofides N.: Graph Theory. An Algoritmic Approach. Academic Press Inc, 1975. ISBN 978-0121743505.

Learning resources -
Last update: MAXOVAJ (07.06.2018)

www.vscht.cz/mat/Ang/indexAng.html

Teaching methods -
Last update: MAXOVAJ (24.09.2018)

lectures, tutorials, individual work on the project

Syllabus -
Last update: MAXOVAJ (08.06.2018)

1. Basic concepts in graph theory. Representations of graphs.

2. Paths in graphs. The task of the shortest path.

3. Connected graphs, Components od connectivity, blocks of graphs.

4. Trees. Heap-sort.

5. Spanning tree. Greedy algorithm for minimal spanning tree.

6. System of distinct representatives. Matching in bipartite graphs.

7. Matching in general graphs.

8. Euler graphs. The Chinese postman problem.

9. Hamiltonian graphs. The travelling salesman problem.

10. Planar graphs and their characteristics.

11. Coloring. Coloring of Planar graphs.

12. Flows in networks.

13. Theory of complexity. P and NP problems. Good characteristics.

14. Examples of graph theory applications.

Registration requirements -
Last update: Mareš Jan doc. Ing. Ph.D. (03.10.2018)

none

Course completion requirements -
Last update: MAXOVAJ (07.06.2018)

The subject is finished by an oral exam. Before the exam is completed, 3 of the tasks assigned during the semester must be successfully solved.