2015
DOI: 10.1002/jcc.24248
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Moment expansion of the linear density‐density response function

Abstract: We present a low rank moment expansion of the linear density-density response function. The general interacting (fully nonlocal) density-density response function is calculated by means of its spectral decomposition via an iterative Lanczos diagonalization technique within linear density functional perturbation theory. We derive a unitary transformation in the space of the eigenfunctions yielding subspaces with well-defined moments. This transformation generates the irreducible representations of the density-d… Show more

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Cited by 6 publications
(26 citation statements)
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“…The second theorem gives rise to a much more efficient algorithm for the calculation of the moment‐expanded states (referred to as direct moment expansion). For the brute force construction of the transformation Q derived in theorem (which corresponds to the algorithm of the moment expansion published in 2016 ) a large number of M eigenstates are calculated, followed by M × N Givens rotations to condense the physically information.…”
Section: Application Of Theorem 1 and 2 To The Linear Density‐densitymentioning
confidence: 99%
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“…The second theorem gives rise to a much more efficient algorithm for the calculation of the moment‐expanded states (referred to as direct moment expansion). For the brute force construction of the transformation Q derived in theorem (which corresponds to the algorithm of the moment expansion published in 2016 ) a large number of M eigenstates are calculated, followed by M × N Givens rotations to condense the physically information.…”
Section: Application Of Theorem 1 and 2 To The Linear Density‐densitymentioning
confidence: 99%
“…For the specific case of the static linear density‐density response function and a specific basis of the perturbing potential, we recently published a recipe for the calculation of the eigensystem representation as well as the moment expansion . Here, we generalize these results to an entire class of linear operators and arbitrary basis sets.…”
Section: Introductionmentioning
confidence: 98%
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“…In With respect to this basis of the pertubing potential, Scherrer presented in 2016 an algorithm for a transformation of the eigenstates, which condenses the full information of the linear map into a few moment generating states. [47] We refer to the new set of states…”
Section: Introductionmentioning
confidence: 99%