15-344: Difference between revisions
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If you are reading section 7.1 in our textbook, you may find example 3 intriguing. There is actually a solution to this problem using graph theoretic tools (to be precise, Euler's formula). |
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[[Media:15-344-Plane Division.pdf | Graph Theory Revisited: Euler's Formula and a Combinatorial Problem]] |
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Revision as of 20:26, 15 December 2015
Introduction to Combinatorics
Department of Mathematics, University of Toronto, Fall 2015
Agenda: Understand graphs and learn to count.
Instructor: Dror Bar-Natan, drorbn@math.toronto.edu (no math over email!), Bahen 6178, 416-946-5438. Office hours: by appointment.
Classes: Tuesdays 3-5 at MP 202 and Thursdays 2-3 at MP 203.
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Teaching Assistant: Gaurav Patil (g.patil@mail.utoronto.ca). Office hours: Mondays 3:30-4:30PM at 215 Huron, room 1012, and Tuesdays 6-7PM at math department lounge, on the 6th floor of the Bahen building.
Tutorials: Two sessions - Thursdays 4-5 and Thursdays 5-6, both at LM 158. |
Text
Our main text book will be Applied Combinatorics (sixth edition) by Alan Tucker, ISBN 978-0-470-45838-9; it is a required reading.
Further Resources
- 1999 class, by Steve Tanny.
- 2002 class, by Andres Del Junco.
- 2008 class, by Dilip Raghavan.
- My 15-344 notebook.
| Dror's notes above / Students' notes below |
If you are reading section 7.1 in our textbook, you may find example 3 intriguing. There is actually a solution to this problem using graph theoretic tools (to be precise, Euler's formula).
Graph Theory Revisited: Euler's Formula and a Combinatorial Problem
