1384758512_795__232_lecture_7.8

Iii self study combinatorial parameters analytic

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Unformatted text preview: FS: Part B: IV, V, VI Appendix B4 Stanley 99: Ch. 6 Handout #1 (self-study) Complex Analysis Unlabelled structures Hooke’s law. If an object of weight x is suspended from a spring, the spring 3 21 II.1, II.2, II.3 Labelled structures I 4 28 II.4, II.5, II.6 Labelled related to x by a linear relation y = a + bx. will be streteched to a length ystructures II 5 Oct 5 III.1, III.2 6 12 IV.1, IV.2 7 19 IV.3, IV.4 8 26 9 Nov 2 10 11 12 IV.5 V.1 Asst #1 Due Multivariable GFs 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 Random Structures and Limit Laws FS: Part C (rotating presentations) Sophie A fitting question. Given a Limit Laws Marni measurements (xi , yi ) (say for i = 25 IX.4 Continuous series of Quasi-Powers and 1,13. . .30, n) IX.5 where xi is a weight and yi the elongation observed for an object of Sophie Gaussia...
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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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