English

Automatic, high-order, and adaptive algorithms for Brillouin zone integration

Strongly Correlated Electrons 2023-08-09 v3 Materials Science Numerical Analysis Numerical Analysis

Abstract

We present efficient methods for Brillouin zone integration with a non-zero but possibly very small broadening factor η\eta, focusing on cases in which downfolded Hamiltonians can be evaluated efficiently using Wannier interpolation. We describe robust, high-order accurate algorithms automating convergence to a user-specified error tolerance ε\varepsilon, emphasizing an efficient computational scaling with respect to η\eta. After analyzing the standard equispaced integration method, applicable in the case of large broadening, we describe a simple iterated adaptive integration algorithm effective in the small η\eta regime. Its computational cost scales as O(log3(η1))\mathcal{O}(\log^3(\eta^{-1})) as η0+\eta \to 0^+ in three dimensions, as opposed to O(η3)\mathcal{O}(\eta^{-3}) for equispaced integration. We argue that, by contrast, tree-based adaptive integration methods scale only as O(log(η1)/η2)\mathcal{O}(\log(\eta^{-1})/\eta^{2}) for typical Brillouin zone integrals. In addition to its favorable scaling, the iterated adaptive algorithm is straightforward to implement, particularly for integration on the irreducible Brillouin zone, for which it avoids the tetrahedral meshes required for tree-based schemes. We illustrate the algorithms by calculating the spectral function of SrVO3_3 with broadening on the meV scale.

Keywords

Cite

@article{arxiv.2211.12959,
  title  = {Automatic, high-order, and adaptive algorithms for Brillouin zone integration},
  author = {Jason Kaye and Sophie Beck and Alex Barnett and Lorenzo Van Muñoz and Olivier Parcollet},
  journal= {arXiv preprint arXiv:2211.12959},
  year   = {2023}
}
R2 v1 2026-06-28T06:40:35.139Z