Proceedings of the 9th Conference on Interdisciplinary Musicology – CIM14. Berlin, GermanyM ISTIFY: DYNAMICALLY R ECREATING X ENAKIS ’ Mists Thor Kell1 1 - Log-Cauchy distribution - Document - PDFSEARCH.IO

First Page		Document Content
Date: 2014-12-06 10:29:43 Music Probability Mathematical analysis Iannis Xenakis Probability distributions Stochastic UPIC Random walk Cauchy distribution Evryali		Proceedings of the 9th Conference on Interdisciplinary Musicology – CIM14. Berlin, GermanyM ISTIFY: DYNAMICALLY R ECREATING X ENAKIS ’ Mists Thor Kell1 1 Add to Reading List Source URL: tide-pool.ca Download Document from Source Website File Size: 593,87 KB Share Document on Facebook

	1 Preliminaries: A function f : R −→ R is additive if it satisfies the Cauchy equation (CE) f (x+y) = f (x)+f (y) DocID: 1r5HJ - View Document
	A study of multiscale seismic data joint inversion method DocID: 1qCD0 - View Document
	Proceedings of the 9th Conference on Interdisciplinary Musicology – CIM14. Berlin, GermanyM ISTIFY: DYNAMICALLY R ECREATING X ENAKIS ’ Mists Thor Kell1 1 DocID: 1quXG - View Document
$Appendices A. Simulating Fat Tailed Distributions Suppose one wants to simulate a random variable of zero mean and unit variance, but with a given degree of tail fatness (fourth moment). Sticking to the more-or-less \bel$	Appendices A. Simulating Fat Tailed Distributions Suppose one wants to simulate a random variable of zero mean and unit variance, but with a given degree of tail fatness (fourth moment). Sticking to the more-or-less \bel DocID: 19gds - View Document
	Condition Numbers of Matrices Steven Finch January 6, 2015 Let  be a real  ×  matrix and kk = sup k k kk=1 DocID: 17Rvp - View Document