Add to ORKGInternational audienceIn analyzing a simple random walk on the Heisenberg group we encounter the problem of bounding the extreme eigenvalues of an n × n matrix of the form M = C + D where C is a circulant and D a diagonal matrix. The discrete Schrödinger operators are an interesting special case. The Weyl and Horn bounds are not useful here. This paper develops three different approaches to getting good bounds. The first uses the geometry of the eigenspaces of C and D, applying a discrete version of the uncertainty principle. The second shows that, in a useful limit, the matrix M tends to the harmonic oscillator on L 2 (R) and the known eigenstructure can be transferred back. The third approach is purely probabilistic, extending M to an abs...
For a general class of large non-Hermitian random block matrices X we prove that there are no eigenv...
This paper demonstrates an introduction to the statistical distribution of eigenval-ues in Random Ma...
This thesis concerns the spectral theory of Schrödinger and Dirac operators. The main results relate...
International audienceIn analyzing a simple random walk on the Heisenberg group we encounter the pro...
In many applications it is important to have reliable approximations for the extreme eigenvalues of ...
The goal of this article is to study how much the eigenvalues of large Hermitian random matrices dev...
2013-08-13A large class of seemingly disparate Markov chains can be modeled as random walks on the c...
An important topic in random matrix theory is the study of the statistical properties of the eigenva...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
AbstractFor a self-adjoint linear operator with a discrete spectrum or a Hermitian matrix, the “extr...
Let $M_n$ be a random Hermitian (or symmetric) matrix whose upper diagonal and diagonal entries are ...
We study the eigenvalues of polynomials of large random matrices which have only discrete spectra. O...
AbstractExplicit forms for orgodicity coefficients which bound the non-unit eigenvalues of finite st...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
International audienceWe study the spectra of N × N Toeplitz band matrices perturbed by small comple...
For a general class of large non-Hermitian random block matrices X we prove that there are no eigenv...
This paper demonstrates an introduction to the statistical distribution of eigenval-ues in Random Ma...
This thesis concerns the spectral theory of Schrödinger and Dirac operators. The main results relate...
International audienceIn analyzing a simple random walk on the Heisenberg group we encounter the pro...
In many applications it is important to have reliable approximations for the extreme eigenvalues of ...
The goal of this article is to study how much the eigenvalues of large Hermitian random matrices dev...
2013-08-13A large class of seemingly disparate Markov chains can be modeled as random walks on the c...
An important topic in random matrix theory is the study of the statistical properties of the eigenva...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
AbstractFor a self-adjoint linear operator with a discrete spectrum or a Hermitian matrix, the “extr...
Let $M_n$ be a random Hermitian (or symmetric) matrix whose upper diagonal and diagonal entries are ...
We study the eigenvalues of polynomials of large random matrices which have only discrete spectra. O...
AbstractExplicit forms for orgodicity coefficients which bound the non-unit eigenvalues of finite st...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
International audienceWe study the spectra of N × N Toeplitz band matrices perturbed by small comple...
For a general class of large non-Hermitian random block matrices X we prove that there are no eigenv...
This paper demonstrates an introduction to the statistical distribution of eigenval-ues in Random Ma...
This thesis concerns the spectral theory of Schrödinger and Dirac operators. The main results relate...