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High performance Wannier interpolation of Berry curvature and related quantities with WannierBerri code

Stepan S. Tsirkin

2021npj Computational Materials160 citationsDOIOpen Access PDF

Abstract

Abstract Wannier interpolation is a powerful tool for performing Brillouin zone integrals over dense grids of k points, which are essential to evaluate such quantities as the intrinsic anomalous Hall conductivity or Boltzmann transport coefficients. However, more complex physical problems and materials create harder numerical challenges, and computations with the existing codes become very expensive, which often prevents reaching the desired accuracy. In this article, I present a series of methods that boost the speed of Wannier interpolation by several orders of magnitude. They include a combination of fast and slow Fourier transforms, explicit use of symmetries, and recursive adaptive grid refinement among others. The proposed methodology has been implemented in the python code WannierBerri, which also aims to serve as a convenient platform for the future development of interpolation schemes for other phenomena.

Topics & Concepts

Berry connection and curvaturePython (programming language)Wannier functionInterpolation (computer graphics)CurvatureComputationComputer scienceGridCode (set theory)AlgorithmComputational scienceApplied mathematicsMathematicsPhysicsGeometryQuantum mechanicsComputer graphics (images)AnimationProgramming languageOperating systemQuantumSet (abstract data type)Black Holes and Theoretical PhysicsTheoretical and Computational PhysicsAlgebraic structures and combinatorial models
High performance Wannier interpolation of Berry curvature and related quantities with WannierBerri code | Litcius