Two exact relations between mutlifractal exponents are shown to hold at the critical point of the Anderson localization transition. The first relation implies a symmetry of the multifractal spectrum linking the exponents with indices q1/2. The second relation connects the wave-function multifractality to that of Wigner delay times in a system with a lead attached
6 pages, 3 figuresInternational audienceWe present a full description of the nonergodic properties o...
We demonstrate that by considering disordered single-particle Hamiltonians (or their random matrix v...
En dimension trois, un système quantique désordonné peut présenter une transition entre un état méta...
Two exact relations between mutlifractal exponents are shown to hold at the critical point of the An...
We propose a generalization of multifractal analysis that is applicable to the critical regime of th...
Using numerical simulations, we investigate the distribution of Kondo temperatures at the Anderson t...
The multifractality of the critical eigenstate at the metal to insulator transition (MIT) in the thr...
Recently, a concept of generalized multifractality, which characterizes fluctuations and correlation...
Critical fluctuations of wave functions and energy levels at the Anderson transition are studied for...
Non-multifractal critical wave functions at the Anderson transition are numerically investigated for...
We study the multifractal analysis (MFA) of electronic wave functions at the localization-delocaliza...
Systems driven out of equilibrium experience large fluctuations of the dissipated work. The same is ...
The probability density function (PDF) for critical wave function amplitudes is studied in the three...
We study the Anderson transition on a generic model of random graphs with a tunable branching parame...
The statistics of critical wave functions at the Anderson transition in three and four dimensions ar...
6 pages, 3 figuresInternational audienceWe present a full description of the nonergodic properties o...
We demonstrate that by considering disordered single-particle Hamiltonians (or their random matrix v...
En dimension trois, un système quantique désordonné peut présenter une transition entre un état méta...
Two exact relations between mutlifractal exponents are shown to hold at the critical point of the An...
We propose a generalization of multifractal analysis that is applicable to the critical regime of th...
Using numerical simulations, we investigate the distribution of Kondo temperatures at the Anderson t...
The multifractality of the critical eigenstate at the metal to insulator transition (MIT) in the thr...
Recently, a concept of generalized multifractality, which characterizes fluctuations and correlation...
Critical fluctuations of wave functions and energy levels at the Anderson transition are studied for...
Non-multifractal critical wave functions at the Anderson transition are numerically investigated for...
We study the multifractal analysis (MFA) of electronic wave functions at the localization-delocaliza...
Systems driven out of equilibrium experience large fluctuations of the dissipated work. The same is ...
The probability density function (PDF) for critical wave function amplitudes is studied in the three...
We study the Anderson transition on a generic model of random graphs with a tunable branching parame...
The statistics of critical wave functions at the Anderson transition in three and four dimensions ar...
6 pages, 3 figuresInternational audienceWe present a full description of the nonergodic properties o...
We demonstrate that by considering disordered single-particle Hamiltonians (or their random matrix v...
En dimension trois, un système quantique désordonné peut présenter une transition entre un état méta...