1379607230_912__232_lecture_3.6

# 1 12 a3 c introduction to prob mariolys 18 ix1 limit

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Unformatted text preview: athema tic s Week Date Sections Part/ References Topic/Sections MATH 232 S ECTION #3.6 Notes/Speaker from Theorem FS2009 (3.6.6). If A is an n × n square matrix and there exists a positive 1 Sept 7 I.1, I.2, I.3 Symbolic methods integer k I.5, I.6 that Ak = 0Unlabelledthen such Combinatorial Structures n×n , structures 2 14 I.4, 3 21 II.1, II.2, II.3 4 28 II.4, II.5, II.6 5 Oct 5 III.1, III.2 6 12 IV.1, IV.2 7 19 IV.3, IV.4 8 26 9 Nov 2 IV.5 V.1 FS: Part A.1, A.2 Comtet74 Handout #1 (self study) Labelled structures I −1 (In − A) Combinatorial parameters FS A.III (self-study) Analytic Methods FS: Part B: IV, V, VI Appendix B4 Stanley 99: Ch. 6 Handout #1 (self-study) Labelled structures II k −1 2 k −1 = I + A + A + ··· + A Combinatorial Parameters Asst #1 Due Ai . = i=0 Multivariable GFs Complex Analysis Singularity Analysis Asymptotic methods Asst #2 Due 9 VI.1 12 A.3/ C Introduction to Prob. Mariolys 18 IX.1 Limit Laws and Comb Marni 20 IX.2 Discrete Limit Laws Sophie 23 IX.3 Combinatorial instances of discrete Mariolys 25 IX.4 Continuous Limit Laws Marni 13 30 IX.5 Quasi-Powers and Gaussian limit laws Sophie 14 Dec 10 10 11 12 Random Structures and Limit Laws FS: Part C (rotating presentations) Sophie Presentations Asst #3 Due Dr. Marni MISHNA, Department of Mathematics, SIMON FRASER UNIVERSITY Version of: 11-Dec-09 C EDRIC C HAUVE , FALL 2013 10...
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## This note was uploaded on 12/08/2013 for the course MATH 232 taught by Professor Russel during the Fall '10 term at Simon Fraser.

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