Contributions to High–Dimensional Analysis under Kolmogorov Condition

Pielaszkiewicz, Jolanta Maria

January 2015

This thesis is about high–dimensional problems considered under the so{called Kolmogorov condition. Hence, we consider research questions related to random matrices with p rows (corresponding to the parameters) and n columns (corresponding to the sample size), where p &gt; n, assuming that the ratio <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%5Cfrac%7Bp%7D%7Bn%7D" /> converges when the number of parameters and the sample size increase. We focus on the eigenvalue distribution of the considered matrices, since it is a well–known information–carrying object. The spectral distribution with compact support is fully characterized by its moments, i.e., by the normalized expectation of the trace of powers of the matrices. Moreover, such an expectation can be seen as a free moment in the non–commutative space of random matrices of size p x p equipped with the functional <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20%5Cfrac%7B1%7D%7Bp%7DE%5BTr%5C%7B%5Ccdot%5C%7D%5D" />. Here, the connections with free probability theory arise. In the relation to that eld we investigate the closed form of the asymptotic spectral distribution for the sum of the quadratic forms. Moreover, we put a free cumulant–moment relation formula that is based on the summation over partitions of the number. This formula is an alternative to the free cumulant{moment relation given through non{crossing partitions ofthe set. Furthermore, we investigate the normalized <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20E%5B%5Cprod_%7Bi=1%7D%5Ek%20Tr%5C%7BW%5E%7Bm_i%7D%5C%7D%5D" /> and derive, using the dierentiation with respect to some symmetric matrix, a recursive formula for that expectation. That allows us to re–establish moments of the Marcenko–Pastur distribution, and hence the recursive relation for the Catalan numbers. In this thesis we also prove that the <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20%5Cprod_%7Bi=1%7D%5Ek%20Tr%5C%7BW%5E%7Bm_i%7D%5C%7D" />, where <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20W%5Csim%5Cmathcal%7BW%7D_p(I_p,n)" />, is a consistent estimator of the <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20E%5B%5Cprod_%7Bi=1%7D%5Ek%20Tr%5C%7BW%5E%7Bm_i%7D%5C%7D%5D" />. We consider <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20Y_t=%5Csqrt%7Bnp%7D%5Cbig(%5Cfrac%7B1%7D%7Bp%7DTr%5Cbig%5C%7B%5Cbig(%5Cfrac%7B1%7D%7Bn%7DW%5Cbig)%5Et%5Cbig%5C%7D-m%5E%7B(t)%7D_1%20(n,p)%5Cbig)," />, where <img src="http://www.diva-portal.org/cgi-bin/mimetex.cgi?%5Csmall%20m%5E%7B(t)%7D_1%20(n,p)=E%5Cbig%5B%5Cfrac%7B1%7D%7Bp%7DTr%5Cbig%5C%7B%5Cbig(%5Cfrac%7B1%7D%7Bn%7DW%5Cbig)%5Et%5Cbig%5C%7D%5Cbig%5D" />, which is proven to be normally distributed. Moreover, we propose, based on these random variables, a test for the identity of the covariance matrix using a goodness{of{t approach. The test performs very well regarding the power of the test compared to some presented alternatives for both the high–dimensional data (p &gt; n) and the multivariate data (p ≤ n).

Zufallsmatrixtheorie für die Lindblad-Mastergleichung

Lange, Stefan

31 January 2020

Wir wenden die Zufallsmatrixtheorie auf den Lindblad-Superoperator L, d.h. den linearen Superoperator der Lindblad-Gleichung an und untersuchen die Verteilung und die Korrelationen der Eigenwerte von L zur Charakterisierung der Dynamik komplexer offener Quantensysteme. Zufallsmatrixensembles für L werden über Ensembles hermitescher und positiver Matrizen definiert, die alle freien Koeffizienten der Lindblad-Gleichung enthalten. Wir bestimmen Mittelwert und Breiten der Verteilung der von Null verschiedenen Eigenwerte von L in der komplexen Ebene und zeigen, wie diese Verteilung von den Verteilungen und Korrelationen der Eigenwerte der Koeffizientenmatrizen abhängt. In vielerlei Hinsicht ähneln die Ensembles für L dem Ginibreschen orthogonalen Ensemble. Beispielsweise finden wir das gleiche Abstoßungsverhalten zwischen benachbarten Eigenwerten. Alle Ergebnisse werden mit denen einer früheren Zufallsmatrixanalyse von Ratengleichungen verglichen. / Random matrix theory is applied to the Lindblad superoperator L, i.e., the linear superoperator of the Lindblad equation. We study the distribution and correlations of eigenvalues of L to characterize the dynamics of complex open quantum systems. Random matrix ensembles for L are given in terms of ensembles of hermitian and positive matrices, which contain all free coefficients of the Lindblad equation. We determine mean and widths of the distribution of the nonzero eigenvalues of L in the complex plane and show how this distribution depends on the distributions and correlations of eigenvalues of the matrices of coefficients. In many respects the ensembles for L resemble the Ginibre orthogonal ensemble. For instance, we find the same repulsion characteristics for neighboring eigenvalues. All results are compared to an earlier work on random matrix theory for rate equations.

info:eu-repo/classification/ddc/530

ddc:530