Add to ORKGThere exists an exact relationship between the quasi-exactly solvable problems of quantum mechanics and models of square and rectangular random complex matrices. This relationship enables one to reduce the problem of constructing topological (1/N) expansions in random matrix models to the problem of constructing semiclassical expansions for observables in quasi-exactly solvable problems. Lie algebraic aspects of this relationship are also discussed
It is well known that the unitary evolution of a closed $M-$level quantum system can be generated by...
In this thesis, we provide a self contained introduction to the theory of random matrices and matrix...
The paper is devoted to the derivation of random unitary matrices whose spectral statistics is the s...
This paper shows that there is a correspondence between quasi-exactly solvable models in quantum mec...
International audienceThe study of the statistical properties of random matrices of large size has a...
Akemann G, Baik J, Di Francesco P, eds. The Oxford Handbook of Random Matrix Theory. Oxford: Oxford ...
Random-matrix models have been intensively studied in the last few years[1]. Although the bulk of th...
The theory of random matrices, or random matrix theory, RMT in what follows, has been developed at t...
In this paper the relationship between the problem of constructing the ground state energy for the q...
With a foreword by Freeman Dyson, the handbook brings together leading mathematicians and physicists...
We consider a random matrix model with both pairwise and non-pairwise contracted indices. The partit...
We extend the theory of quasi-exactly solvable (QES) models with real energies to include quasinorma...
This thesis deals with the geometric and integrable aspects associated with random matrix models. It...
PhDScattering is a fundamental phenomenon in physics, e.g. large parts of the knowledge about quant...
It is well known that the unitary evolution of a closed $M-$level quantum system can be generated by...
It is well known that the unitary evolution of a closed $M-$level quantum system can be generated by...
In this thesis, we provide a self contained introduction to the theory of random matrices and matrix...
The paper is devoted to the derivation of random unitary matrices whose spectral statistics is the s...
This paper shows that there is a correspondence between quasi-exactly solvable models in quantum mec...
International audienceThe study of the statistical properties of random matrices of large size has a...
Akemann G, Baik J, Di Francesco P, eds. The Oxford Handbook of Random Matrix Theory. Oxford: Oxford ...
Random-matrix models have been intensively studied in the last few years[1]. Although the bulk of th...
The theory of random matrices, or random matrix theory, RMT in what follows, has been developed at t...
In this paper the relationship between the problem of constructing the ground state energy for the q...
With a foreword by Freeman Dyson, the handbook brings together leading mathematicians and physicists...
We consider a random matrix model with both pairwise and non-pairwise contracted indices. The partit...
We extend the theory of quasi-exactly solvable (QES) models with real energies to include quasinorma...
This thesis deals with the geometric and integrable aspects associated with random matrix models. It...
PhDScattering is a fundamental phenomenon in physics, e.g. large parts of the knowledge about quant...
It is well known that the unitary evolution of a closed $M-$level quantum system can be generated by...
It is well known that the unitary evolution of a closed $M-$level quantum system can be generated by...
In this thesis, we provide a self contained introduction to the theory of random matrices and matrix...
The paper is devoted to the derivation of random unitary matrices whose spectral statistics is the s...