International audienceIn this note, we study the n x n random Euclidean matrix whose entry (i,j) is equal to f (|| Xi - Xj ||) for some function f and the Xi's are i.i.d. isotropic vectors in Rp. In the regime where n and p both grow to infinity and are proportional, we give some sufficient conditions for the empirical distribution of the eigenvalues to converge weakly. We illustrate our result on log-concave random vectors
Götze F, Tikhomirov A. THE CIRCULAR LAW FOR RANDOM MATRICES. ANNALS OF PROBABILITY. 2010;38(4):1444-...
International audienceWe establish new tail estimates for order statistics and for the Euclidean nor...
We study the Restricted Isometry Property of a random matrix Γ with independent isotropic log-concav...
International audienceIn this note, we study the n x n random Euclidean matrix whose entry (i,j) is ...
We consider n × n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random m...
International audienceWe consider n × n real symmetric and hermitian random matrices Hn,m equals the...
International audienceLet A be a matrix whose columns X 1 ,. .. , X N are independent random vectors...
We explore the validity of the circular law for random matrices with non-i.i.d. entries. Let M be an...
International audienceLet K be an isotropic convex body in Rn. Given ε > 0, how many independent poi...
Let K be an isotropic convex body in Rn. Given ε> 0, how many independent points Xi uniformly dis...
AbstractLet X be n × N containing i.i.d. complex entries with E |X11 − EX11|2 = 1, and T an n × n ra...
International audienceWe study the Restricted Isometry Property of a random matrix Γ with independen...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
Abstract. In this paper, we present a simple, yet useful, concentration result concerning random (we...
Götze F, Tikhomirov A. THE CIRCULAR LAW FOR RANDOM MATRICES. ANNALS OF PROBABILITY. 2010;38(4):1444-...
International audienceWe establish new tail estimates for order statistics and for the Euclidean nor...
We study the Restricted Isometry Property of a random matrix Γ with independent isotropic log-concav...
International audienceIn this note, we study the n x n random Euclidean matrix whose entry (i,j) is ...
We consider n × n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random m...
International audienceWe consider n × n real symmetric and hermitian random matrices Hn,m equals the...
International audienceLet A be a matrix whose columns X 1 ,. .. , X N are independent random vectors...
We explore the validity of the circular law for random matrices with non-i.i.d. entries. Let M be an...
International audienceLet K be an isotropic convex body in Rn. Given ε > 0, how many independent poi...
Let K be an isotropic convex body in Rn. Given ε> 0, how many independent points Xi uniformly dis...
AbstractLet X be n × N containing i.i.d. complex entries with E |X11 − EX11|2 = 1, and T an n × n ra...
International audienceWe study the Restricted Isometry Property of a random matrix Γ with independen...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
AbstractA stronger result on the limiting distribution of the eigenvalues of random Hermitian matric...
Abstract. In this paper, we present a simple, yet useful, concentration result concerning random (we...
Götze F, Tikhomirov A. THE CIRCULAR LAW FOR RANDOM MATRICES. ANNALS OF PROBABILITY. 2010;38(4):1444-...
International audienceWe establish new tail estimates for order statistics and for the Euclidean nor...
We study the Restricted Isometry Property of a random matrix Γ with independent isotropic log-concav...
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