Litcius/Paper detail

Fast Fourier-Chebyshev Approach to Real-Space Simulations of the Kubo Formula

Santiago Giménez de Castro, J. M. Viana Parente Lopes, Aires Ferreira, D. A. Bahamon

2024Physical Review Letters16 citationsDOIOpen Access PDF

Abstract

The Kubo formula is a cornerstone in our understanding of near-equilibrium transport phenomena. While conceptually elegant, the application of Kubo's linear-response theory to interesting problems is hindered by the need for algorithms that are accurate and scalable to large lattice sizes beyond one spatial dimension. Here, we propose a general framework to numerically study large systems, which combines the spectral accuracy of Chebyshev expansions with the efficiency of divide-and-conquer methods. We use the hybrid algorithm to calculate the two-terminal conductance and the bulk conductivity tensor of 2D lattice models with over 10^{7} sites. By efficiently sampling the microscopic information contained in billions of Chebyshev moments, the algorithm is able to accurately resolve the linear-response properties of complex systems in the presence of quenched disorder. Our results lay the groundwork for future studies of transport phenomena in previously inaccessible regimes.

Topics & Concepts

Chebyshev filterLattice (music)Chebyshev polynomialsStatistical physicsFourier transformKubo formulaDimension (graph theory)Curse of dimensionalityComputer scienceMathematicsPhysicsMathematical analysisConductivityQuantum mechanicsPure mathematicsMachine learningAcousticsQuantum and electron transport phenomenaQuantum many-body systemsPhysics of Superconductivity and Magnetism