Standard grids for high-precision integration of modern density functionals: SG-2 and SG-3

Density-functional approximations developed in the past decade necessitate the use of quadrature grids that are far more dense than those required to integrate older generations of functionals. This category of difficult-to-integrate functionals includes meta-generalized gradient approximations, which depend on orbital gradients and/or the Laplacian of the density, as well as functionals based on B97 and the popular Minnesota class of functionals, each of which contain complicated and/or oscillatory expressions for the exchange inhomogeneity factor. Following a strategy introduced previously by Gill and co-workers to develop the relatively sparse SG-0 and SG-1 standard quadrature grids, we introduce two higher-quality grids that we designate SG-2 and SG-3, obtained by systematically pruning medium- and high-quality atom-centered grids. The pruning procedure affords computational speedups approaching a factor of two for hybrid functionals applied to systems of approximate to 100 atoms, without significant loss of accuracy. The grid dependence of several popular density functionals is characterized for various properties. (c) 2017 Wiley Periodicals, Inc.