A Generalized Grid-Based Fast Multipole Method for Integrating Helmholtz Kernels

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• 作者：Pauli Parkkinen ; Sergio A. Losilla ; Eelis Solala ; Elias A. Toivanen ; Wen-Hua Xu ; Dage Sundholm
• 刊名：Journal of Chemical Theory and Computation
• 出版年：2017
• 出版时间：February 14, 2017
• 年：2017
• 卷：13
• 期：2
• 页码：654-665
• 全文大小：540K
• ISSN：1549-9626

文摘

A grid-based fast multipole method (GB-FMM) for optimizing three-dimensional (3D) numerical molecular orbitals in the bubbles and cube double basis has been developed and implemented. The present GB-FMM method is a generalization of our recently published GB-FMM approach for numerically calculating electrostatic potentials and two-electron interaction energies. The orbital optimization is performed by integrating the Helmholtz kernel in the double basis. The steep part of the functions in the vicinity of the nuclei is represented by one-center bubbles functions, whereas the remaining cube part is expanded on an equidistant 3D grid. The integration of the bubbles part is treated by using one-center expansions of the Helmholtz kernel in spherical harmonics multiplied with modified spherical Bessel functions of the first and second kind, analogously to the numerical inward and outward integration approach for calculating two-electron interaction potentials in atomic structure calculations. The expressions and algorithms for massively parallel calculations on general purpose graphics processing units (GPGPU) are described. The accuracy and the correctness of the implementation has been checked by performing Hartree–Fock self-consistent-field calculations (HF-SCF) on H₂, H₂O, and CO. Our calculations show that an accuracy of 10^–4 to 10^–7 E_h can be reached in HF-SCF calculations on general molecules.