1983
DOI: 10.1103/physrevd.28.418
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Shifted1Nexpansions for energy eigenvalues of the Schrödinger equation

Abstract: The l l N expansion is a useful way of solving the Schrodinger equation to very high orders. We present a modified, physically motivated approach, called the shil'ted 1 / N expansion, which dramatically improves the analytic s~mplicity and convergence of the perturbation series for the energy eigenvalues.

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Cited by 115 publications
(60 citation statements)
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“…Our rst solvable example is the three-body potential of the form V 1 = p 3f 1 2r 2 " (x 1 + x 2 2x 3 ) (x 1 x 2 ) + cyclic terms # ; (198) which is added to the Calogero potential V C of eq. (196 (199) To see why potentials given by eqs. (196) to (198) …”
Section: Shape Invariance and 3-body Solvable Potentialsmentioning
confidence: 99%
See 1 more Smart Citation
“…Our rst solvable example is the three-body potential of the form V 1 = p 3f 1 2r 2 " (x 1 + x 2 2x 3 ) (x 1 x 2 ) + cyclic terms # ; (198) which is added to the Calogero potential V C of eq. (196 (199) To see why potentials given by eqs. (196) to (198) …”
Section: Shape Invariance and 3-body Solvable Potentialsmentioning
confidence: 99%
“…A slightly modied, physically motivated approach, called the \shifted large-N method" [196,197,198,199] incorporates exactly known analytic results into 1=N expansions, greatly enhancing their accuracy, simplicity and range of applicability. In this subsection, we will descibe how the rate of convergence of shifted 1=N expansions can be still further improved by using the ideas of SUSY QM [77].…”
Section: Supersymmetry and Large-n Expansionsmentioning
confidence: 99%
“…A slightly modified, physically motivated approach, called the "shifted large-N method" [196,197,198,199] incorporates exactly known analytic results into 1/N expansions, greatly enhancing their accuracy, simplicity and range of applicability. In this subsection, we will descibe how the rate of convergence of shifted 1/N expansions can be still further improved by using the ideas of SUSY QM [77].…”
Section: Supersymmetry and Large-n Expansionsmentioning
confidence: 99%
“…Here we mention the standard perturbation RayleighSchrödinger theory ( [1][2]), the quasiclassical or WKB method ( [1][2]), 1/N -expansion ( [3,4]). We will not go into details of these methods and refer readers to the numerous literature (see, for example, [1][2][3][4]).…”
Section: Introductionmentioning
confidence: 99%