Add to ORKGThis book provides an introduction to the mathematical theory of disorder effects on quantum spectra and dynamics. Topics covered range from the basic theory of spectra and dynamics of self-adjoint operators through Anderson localization-presented here via the fractional moment method, up to recent results on resonant delocalization. The subject's multifaceted presentation is organized into seventeen chapters, each focused on either a specific mathematical topic or on a demonstration of the theory's relevance to physics, e.g., its implications for the quantum Hall effect. The mathematical chapters include general relations of quantum spectra and dynamics, ergodicity and its implications, methods for establishing spectral and dynamical local...
Abstract. We discuss two different approaches to the study of the long-time behavior of some disorde...
The thesis is divided into two parts. In the first part we introduce supersymmetric analysis and dis...
This thesis studies random Schroedinger operators with connections to group theory and models from s...
We study statistical properties of the eigenfunctions in the three-dimensional Anderson model of loc...
We analyse the spectral phase diagram of Schrödinger operators T + λV on regular tree graphs, with ...
This thesis is concerned with many-body quantum dynamics in lattice models. Our focus is on the spec...
The study of quantum disorder has generated considerable research activity in mathematics and physic...
The theory of random Schrödinger operators is devoted to the mathematical analysis of quantum mechan...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
Anderson’s groundbreaking discovery that the presence of stochastic imperfections in a crystal may r...
This chapter is devoted to various interactions between the graph theory and mathematical physics of...
We study quantum Hamiltonians with potentials defined by strictly ergodic dynamical systems. Our int...
We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators i...
Abstract –Our recently established criterion for the formation of extended states on tree graphs in ...
This classic text provides an excellent introduction to a new and rapidly developing field of resear...
Abstract. We discuss two different approaches to the study of the long-time behavior of some disorde...
The thesis is divided into two parts. In the first part we introduce supersymmetric analysis and dis...
This thesis studies random Schroedinger operators with connections to group theory and models from s...
We study statistical properties of the eigenfunctions in the three-dimensional Anderson model of loc...
We analyse the spectral phase diagram of Schrödinger operators T + λV on regular tree graphs, with ...
This thesis is concerned with many-body quantum dynamics in lattice models. Our focus is on the spec...
The study of quantum disorder has generated considerable research activity in mathematics and physic...
The theory of random Schrödinger operators is devoted to the mathematical analysis of quantum mechan...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
Anderson’s groundbreaking discovery that the presence of stochastic imperfections in a crystal may r...
This chapter is devoted to various interactions between the graph theory and mathematical physics of...
We study quantum Hamiltonians with potentials defined by strictly ergodic dynamical systems. Our int...
We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators i...
Abstract –Our recently established criterion for the formation of extended states on tree graphs in ...
This classic text provides an excellent introduction to a new and rapidly developing field of resear...
Abstract. We discuss two different approaches to the study of the long-time behavior of some disorde...
The thesis is divided into two parts. In the first part we introduce supersymmetric analysis and dis...
This thesis studies random Schroedinger operators with connections to group theory and models from s...