Introduction to Graph Theory 360-MS1-2ZTGa
Course profile: academic
Form of study: stationary
Course type: obligatory
Academic discipline: science and natural science, field of study in the arts and science: mathematics
Year: 2, semester: 3
Prerequisities: Combinatorics
lecture 15 h. exercise class 30 h.
Verification methods: lectures, exercises, consultations, studying literature, home works, discussions in groups.
ECTS credits: 4
Balance of student workload:
attending lectures15x1h = 15h
attending exercise classes 7x4h + 2h(preliminary teaching) = 30h
preparation for classes 7x3h = 21h
completing notes after exercises and lectures 9x2h = 18h
consultations 5x1h = 5h
final work: preparation and take 10h + 2h = 12h
Quantitative description
Direct interaction with the teacher: 53 h., 2 ECTS
Practical exercises: 74 h., 4 ECTS
Rodzaj przedmiotu
Koordynatorzy przedmiotu
Efekty kształcenia
Learning outcomes:
Knows fundamental notions of the Graph Theory; can give examples illustrating various types of graphs he was tought about.
Knows the notions of a path, cycle, Euler graph, and Hamilton graph. He also knows theorems associated with problems where these graphs appeared (the Euler, the Ore, and the Dirac Theorems) and can apply these theorems to concrete graphs and classes of graphs.
Knows basic applications of graph theory in finding (in practice) a shortest path in various examples.
Learns methodological bases for the applying graph theory in everyday problems and solving its elementary problems.
KA6_WG01, KA6_WG03, KA6_WG04, KA6_WG02, KA6_UK01, KA6_UK02, KA6_UW02, KA6_UW03, KA6_UW06, KA6_UW18, KA6_UK03, KA6_WK01, KA6_UW15, KA6_KK01, KA6_UU01, KA6_KK02
Kryteria oceniania
The overall form of credit for the course: test
Literatura
1) R. J. Wilson, Introduction to graph theory, Pearson, 2010
2) R. Diestel, Graph Theory, Springer Verlag, 2000
Więcej informacji
Dodatkowe informacje (np. o kalendarzu rejestracji, prowadzących zajęcia, lokalizacji i terminach zajęć) mogą być dostępne w serwisie USOSweb: