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Mazur

Combinatorics

A Guided Tour

Medium: Buch
ISBN: 978-0-88385-762-5
Verlag: Mathematical Association of America (MAA)
Erscheinungstermin: 18.03.2010
Lieferfrist: bis zu 10 Tage

Combinatorics is mathematics of enumeration, existence, construction, and optimization questions concerning finite sets. This text focuses on the first three types of questions and covers basic counting and existence principles, distributions, generating functions, recurrence relations, Pólya theory, combinatorial designs, error correcting codes, partially ordered sets, and selected applications to graph theory including the enumeration of trees, the chromatic polynomial, and introductory Ramsey theory. The only prerequisites are single-variable calculus and familiarity with sets and basic proof techniques. It is flexible enough to be used for undergraduate courses in combinatorics, second courses in discrete mathematics, introductory graduate courses in applied mathematics programs, as well as for independent study or reading courses. It also features approximately 350 reading questions spread throughout ist eight chapters. These questions provide checkpoints for learning and prepare the reader for the end-of-section exercises of which there are over 470.


Produkteigenschaften


  • Artikelnummer: 9780883857625
  • Medium: Buch
  • ISBN: 978-0-88385-762-5
  • Verlag: Mathematical Association of America (MAA)
  • Erscheinungstermin: 18.03.2010
  • Sprache(n): Englisch
  • Auflage: UK Auflage
  • Serie: Mathematical Association of America Textbooks
  • Produktform: Gebunden
  • Gewicht: 890 g
  • Seiten: 410
  • Format (B x H x T): 184 x 261 x 27 mm
  • Ausgabetyp: Kein, Unbekannt
Autoren/Hrsg.

Autoren

David R. Mazur is Associate Professor of Mathematics at Western New England College in Springfield, Massachusetts. He was born on October 23, 1971 in Washington, D.C. He received his undergraduate degree in Mathematics from the University of Delaware in 1993, and also won the Department of Mathematical Sciences' William D. Clark prize for 'unusual ability' in the major that year. He then received two fellowships for doctoral study in the Department of Mathematical Sciences (now the Department of Applied Mathematics and Statistics) at The Johns Hopkins University. From there he received his Master's in 1996 and his Ph.D. in 1999 under the direction of Leslie A. Hall, focusing on operations research, integer programming, and polyhedral combinatorics. His dissertation, 'Integer Programming Approaches to a Multi-Facility Location Problem', won first prize in the 1999 joint United Parcel Service/INFORMS Section on Location Analysis Dissertation Award Competition. The competition occurs once every two years to recognize outstanding dissertations in the field of location analysis. Professor Mazur began teaching at Western New England College in 1999 and received tenure and promotion to Associate Professor in 2005. He was a 2000–2001 Project NExT fellow and continues to serve this program as a consultant. He is an active member of the Mathematical Association of America, having co-organized several sessions at national meetings. He currently serves on the MAA's Membership Committee.

Preface
Before you go
Notation
Part I. Principles of Combinatorics: 1. Typical counting questions, the product principle
2. Counting, overcounting, the sum principle
3. Functions and the bijection principle
4. Relations and the equivalence principle
5. Existence and the pigeonhole principle
Part II. Distributions and Combinatorial Proofs: 6. Counting functions
7. Counting subsets and multisets
8. Counting set partitions
9. Counting integer partitions
Part III. Algebraic Tools: 10. Inclusion-exclusion
11. Mathematical induction
12. Using generating functions, part I
13. Using generating functions, part II
14. techniques for solving recurrence relations
15. Solving linear recurrence relations
Part IV. Famous Number Families: 16. Binomial and multinomial coefficients
17. Fibonacci and Lucas numbers
18. Stirling numbers
19. Integer partition numbers
Part V. Counting Under Equivalence: 20. Two examples
21. Permutation groups
22. Orbits and fixed point sets
23. Using the CFB theorem
24. Proving the CFB theorem
25. The cycle index and Pólya's theorem
Part VI. Combinatorics on Graphs: 26. Basic graph theory
27. Counting trees
28. Colouring and the chromatic polynomial
29. Ramsey theory
Part VII. Designs and Codes: 30. Construction methods for designs
31. The incidence matrix, symmetric designs
32. Fisher's inequality, Steiner systems
33. Perfect binary codes
34. Codes from designs, designs from codes
Part VIII. Partially Ordered Sets: 35. Poset examples and vocabulary
36. Isomorphism and Sperner's theorem
37. Dilworth's theorem
38. Dimension
39. Möbius inversion, part I
40. Möbius inversion, part II
Bibliography
Hints and answers to selected exercises.