Convergence rates of supercell calculations in the reduced Hartree - Fock model

David Gontier; Salma Lahbabi

doi:10.1051/m2an/2015084

Convergence rates of supercell calculations in the reduced Hartree - Fock model

David Gontier
, Salma Lahbabi

Université Hassan II Aïn Chock - Casablanca et LASAARE

Research output: Contribution to journal › Article › peer-review

Abstract

This article is concerned with the numerical simulations of perfect crystals. We study the rate of convergence of the reduced Hartree-Fock (rHF) model in a supercell towards the periodic rHF model in the whole space. We prove that, whenever the crystal is an insulator or a semi-conductor, the supercell energy per unit cell converges exponentially fast towards the periodic rHF energy per unit cell, with respect to the size of the supercell.

Original language	English
Pages (from-to)	1403-1424
Number of pages	22
Journal	Mathematical Modelling and Numerical Analysis
Volume	50
Issue number	5
DOIs	https://doi.org/10.1051/m2an/2015084
Publication status	Published - 1 Sept 2016

Keywords

analytic functions
Reduced Hartree-Fock
Riemann sums
supercell model

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abstract = "This article is concerned with the numerical simulations of perfect crystals. We study the rate of convergence of the reduced Hartree-Fock (rHF) model in a supercell towards the periodic rHF model in the whole space. We prove that, whenever the crystal is an insulator or a semi-conductor, the supercell energy per unit cell converges exponentially fast towards the periodic rHF energy per unit cell, with respect to the size of the supercell.",

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AU - Lahbabi, Salma

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PY - 2016/9/1

Y1 - 2016/9/1

N2 - This article is concerned with the numerical simulations of perfect crystals. We study the rate of convergence of the reduced Hartree-Fock (rHF) model in a supercell towards the periodic rHF model in the whole space. We prove that, whenever the crystal is an insulator or a semi-conductor, the supercell energy per unit cell converges exponentially fast towards the periodic rHF energy per unit cell, with respect to the size of the supercell.

AB - This article is concerned with the numerical simulations of perfect crystals. We study the rate of convergence of the reduced Hartree-Fock (rHF) model in a supercell towards the periodic rHF model in the whole space. We prove that, whenever the crystal is an insulator or a semi-conductor, the supercell energy per unit cell converges exponentially fast towards the periodic rHF energy per unit cell, with respect to the size of the supercell.

KW - analytic functions

KW - Reduced Hartree-Fock

KW - Riemann sums

KW - supercell model

UR - https://www.scopus.com/pages/publications/84982860175

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DO - 10.1051/m2an/2015084

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JO - Mathematical Modelling and Numerical Analysis

JF - Mathematical Modelling and Numerical Analysis

IS - 5

ER -

Convergence rates of supercell calculations in the reduced Hartree - Fock model

Abstract

Keywords

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