Babes-Bolyai University of Cluj-Napoca
Faculty of Mathematics and Computer Science
Study Cycle: Graduate

SUBJECT

Code
Subject
MIG0002 Special Topics in Combinatorics
Section
Semester
Hours: C+S+L
Category
Type
Computer Science - in Hungarian
8
2+2+0
optional
Computer Science - in Hungarian
4
2+2+0
speciality
optional
Mathematics-Computer Science - in Hungarian
6
2+2+0
speciality
optional
Teaching Staff in Charge
Prof. KASA Zoltan, Ph.D.,  kasacs.ubbcluj.ro
Aims
Familiarization with the combinatorics notions, which are not treated in other courses.
Content
1. Generalization of combinations and permutations.
2. Generating functions.
3. Solving recurrence equations.
3. Counting and enumerating problems. Using generating functions in counting problems.
4. Remarkable numbers in combinatorics (Fibonacci, Catalan, Stirling, Bell)
5. Principles in combinatorisc.
6. Combinatorics of words. Complexity of finite and infinite words.
References
1. KÁSA ZOLTÁN: Combinatorica cu aplicatii, Ed. Presa Universitara Clujeana, 2003.
2. I. TOMESCU: Introducere in combinatorica, Ed. Tehnica, 1975.
3. CORMEN-LEISERSON-RIVEST: Algoritmusok, Mţszaki Könyvkiadó, Budapest, I. kiadás 1997, II. kiadás 1999, III. kiadás 2000. (IN ROMANA:. Cormen-Leiserson-Rivest: Introducere in algoritmi, Ed. Libris Computer Agora, 2000.IN ENGLEZA: Cormen, T.H., Leiserson, C.E., Rivest, R.R., Stein, C.: Introduction to Algorithms, Mit Press-McGraw Hill, 2001. Second edition)
4. LOVÁSZ LÁSZLÓ: Kombinatorikai problémák és feladatok, Typotex Kiadó, Budapest, 1999.
5. R. L. GRAHAM-D. E. KNUTH-O. PATASHNIK: Konkrét matematika, Műszaki Kiadó, Budapest, 1998.
6. LOTHAIRE, M.: Algebraic combinatorics on words, Cambridge University Press, 2002.
7. WILF, H, S.: Geratingfunctionology, Academsi Press, Boston, 1996.

Assessment
Homework + written exam 50-50%.
Links: Syllabus for all subjects
Romanian version for this subject
Rtf format for this subject