Supersymmetric cluster expansions and applications to random Schrödinger operators
From MaRDI portal
Publication:830509
DOI10.1007/s11040-021-09375-5zbMath1469.82016arXiv2004.00145OpenAlexW3133158774MaRDI QIDQ830509
Publication date: 7 May 2021
Published in: Mathematical Physics, Analysis and Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2004.00145
Supersymmetric field theories in quantum mechanics (81T60) Disordered systems (random Ising models, random Schrödinger operators, etc.) in equilibrium statistical mechanics (82B44)
Related Items (2)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Supermathematics and its applications in statistical physics. Grassmann variables and the method of supersymmetry
- How to resum Feynman graphs
- Anderson localization for a supersymmetric sigma model
- Quasi-diffusion in a 3D supersymmetric hyperbolic sigma model
- The two-dimensional Hubbard model on the honeycomb lattice
- Kotani theory for one dimensional stochastic Jacobi matrices
- Lifshitz tails and localization in the three-dimensional Anderson model
- Absence of diffusion in the Anderson tight binding model for large disorder or low energy
- Analyticity of the density of states and replica method for random Schrödinger operators on a lattice
- A supersymmetric transfer matrix and differentiability of the density of states in the one-dimensional Anderson model
- Smoothness of the density of states in the Anderson model at high disorder
- Particle spin dynamics as the Grassmann variant of classical mechanics
- Localization at large disorder and at extreme energies: an elementary derivation
- Supersymmetry and localization
- Lifshitz tails for 2-dimensional random Schrödinger operators.
- Localization and universality of Poisson statistics for the multidimensional Anderson model at weak disorder.
- Convergence of perturbation expansions in fermionic models. I: Nonperturbative bounds
- Universality for 1d random band matrices: sigma-model approximation
- A rigorous replica trick approach to Anderson localization in one dimension
- Weak disorder localization and Lifshitz tails
- Density of states for random band matrices
- Analyticity of density of states in a gauge-invariant model for disordered electronic systems.
- A supersymmetric hierarchical model for weakly disordered \(3d\) semimetals
- Supersymmetric polar coordinates with applications to the Lloyd model
- Density of states for random band matrices in two dimensions
- Universality of the local regime for the block band matrices with a finite number of blocks
- The density of states in the Anderson model at weak disorder: A renormalization group analysis of the hierarchical model
- Supersymmetric measures and maximum principles in the complex domain. Exponential decay of green's functions
- Exponential decay of averaged Green functions for random schrödinger operators. A direct approach
- Fermionic Functional Integrals and the Renormalization Group
- LOCALIZATION AT WEAK DISORDER: SOME ELEMENTARY BOUNDS
- Localization and diagonalization: A review of functional integral techniques for low-dimensional gauge theories and topological field theories
- ANDERSON LOCALIZATION AND SUPERSYMMETRY
- TRANSFER OPERATOR APPROACH TO 1D RANDOM BAND MATRICES
- Introduction to a Renormalisation Group Method
- Density of states for Gaussian unitary ensemble, Gaussian orthogonal ensemble, and interpolating ensembles through supersymmetric approach
- Supersymmetric field theories and stochastic differential equations
- Renormalization group for one-dimensional fermions. A review on mathematical results
- Finite-volume fractional-moment criteria for Anderson localization
This page was built for publication: Supersymmetric cluster expansions and applications to random Schrödinger operators
