Rank-uniform local law for Wigner matrices
Giorgio Cipolloni, László Erdős, Dominik Schröder
Abstract
Abstract We prove a general local law for Wigner matrices that optimally handles observables of arbitrary rank and thus unifies the well-known averaged and isotropic local laws. As an application, we prove a central limit theorem in quantum unique ergodicity (QUE): that is, we show that the quadratic forms of a general deterministic matrix A on the bulk eigenvectors of a Wigner matrix have approximately Gaussian fluctuation. For the bulk spectrum, we thus generalise our previous result [17] as valid for test matrices A of large rank as well as the result of Benigni and Lopatto [7] as valid for specific small-rank observables.
Topics & Concepts
ObservableRank (graph theory)MathematicsErgodicityEigenvalues and eigenvectorsGaussianCentral limit theoremLimit (mathematics)Quadratic equationMatrix (chemical analysis)IsotropyPure mathematicsSpectrum (functional analysis)QuantumLawStatistical physicsQuantum mechanicsPhysicsCombinatoricsMathematical analysisStatisticsGeometryMaterials scienceComposite materialPolitical scienceRandom Matrices and ApplicationsQuantum Information and CryptographyQuantum many-body systems