Add to ORKGInternational audienceIn this article, we prove that k-dimensional spherical integrals are asymptotically equivalent to the product of 1-dimensional spherical integrals. This allows us to generalize several large deviations principles in random matrix theory known before only in a onedimensional case. As examples, we study the universality of the large deviations for k extreme eigenvalues of Wigner matrices (resp. Wishart matrices, resp. matrices with general variance profiles) with sharp sub-Gaussian entries, as well as large deviations principles for extreme eigenvalues of Gaussian Wigner and Wishart matrices with a finite dimensional perturbation
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
AbstractWe estimate the asymptotics of spherical integrals of real symmetric or Hermitian matrices w...
AbstractConsider the spherical integral I(β)N(DN, EN)≔∫exp{Ntr(UDNU*EN)}dmβN(U), where mβN denote th...
70 pages, we added the description of measures which we have large deviation lower bound using the f...
In this article we study the Dyson Bessel process, which describes the evolution of singular values ...
AbstractConsider the spherical integral I(β)N(DN, EN)≔∫exp{Ntr(UDNU*EN)}dmβN(U), where mβN denote th...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
AbstractThis paper considers asymptotic expansions of certain expectations which appear in the theor...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
AbstractWe estimate the asymptotics of spherical integrals of real symmetric or Hermitian matrices w...
AbstractConsider the spherical integral I(β)N(DN, EN)≔∫exp{Ntr(UDNU*EN)}dmβN(U), where mβN denote th...
70 pages, we added the description of measures which we have large deviation lower bound using the f...
In this article we study the Dyson Bessel process, which describes the evolution of singular values ...
AbstractConsider the spherical integral I(β)N(DN, EN)≔∫exp{Ntr(UDNU*EN)}dmβN(U), where mβN denote th...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
International audienceIn this paper, we consider the addition of two matrices in generic position, n...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
In this article, we consider random Wigner matrices, that is symmetric matrices such that the subdia...
AbstractThis paper considers asymptotic expansions of certain expectations which appear in the theor...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
The high frequency behaviour for random eigenfunctions of the spherical Laplacian has been recently ...
AbstractWe estimate the asymptotics of spherical integrals of real symmetric or Hermitian matrices w...