1381109946_687__232a4 (2)

Thegfs a 36 d4 a is a zero matrix of some size 7 19

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Unformatted text preview: Analysis 0 −2 0 0 −2 −3 0 3.6: D6. The possibilities are Part B: IV, V, ,VI , , and . FS: 0 −2 0 Singularity 0 −3 − 0 −2 8 26 Analysis3 Appendix B4 −1 V.1 IV.5 , so A is also diagonal. Both A and D lack zero elements on their diagonals, since they are invertible. 3.6: D9. A = D Stanley 99: Ch. 6 9 Nov 2 Asst #2 Due Asymptotic methods 3.6: D10. FFTTT Handout #1 3.6: D11. (a) F, VI.1 T, (e) F (self-study) (d) 9 Sophie 10 12 A.3/ Introduction entries Mariolys 4.1: 34. ComputeC AB and BA and note that the onlyto Prob. that might not match are the upper right ones. Write the equation that makes these match and note that it is the sameLawsthe equation that makes the determinant mentioned in the problem equal to zero. 18 IX.1 Limit as and Comb Marni ab 11 2 . From A and A2 you can compute tr(A), tr(A2 ), and det(A), and verify the formula given in 4.1: 36. 20 Write A = , Random Structures and compute A IX.2 Discrete Limit Laws Sophie cd and Limit Laws the problem. FS: Part C Combinatorial IX.3 Mariolys 4.1: D3.23 6 (rotating instances of discrete 12 presentations) 25 IX.4 Additional questions: 2 3/2 −5/2 13 30 2 . A1: A = 3/2 IX.5 6 −5/2 2 0 14 A2: TheDec 10 minimum value is 2. Continuous Limit Laws Marni Quasi-Powers and Gaussian limit laws 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 4...
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