1984
DOI: 10.1103/physrevd.29.1669
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Energy eigenstates of spherically symmetric potentials using the shifted1Nexpansion

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Cited by 200 publications
(160 citation statements)
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“…Up to this point, one would conclude that the above procedure is nothing but an imitation of the eminent shifted large-N expansion (SLNT) [12,14,16,[20][21][22]. However, because of the limited capability of SLNT in handling largeorder corrections via the standard Rayleigh-Schrödinger perturbation theory, only low-order corrections have been reported, sacrificing in effect its preciseness.…”
Section: The Methodsmentioning
confidence: 99%
“…Up to this point, one would conclude that the above procedure is nothing but an imitation of the eminent shifted large-N expansion (SLNT) [12,14,16,[20][21][22]. However, because of the limited capability of SLNT in handling largeorder corrections via the standard Rayleigh-Schrödinger perturbation theory, only low-order corrections have been reported, sacrificing in effect its preciseness.…”
Section: The Methodsmentioning
confidence: 99%
“…Indeed, in spite of an amazing universality of all the different 1/ℓ (better known as 1/N) expansion techniques (cf. a small sample of the relevant computational tricks in [28]), one usually finds and returns to the common harmonic oscillator H (HO) 0 ≡ H (q=0) , in spite of the wealth and variability of the underlying physics [29]. For this reason we recently started to study some alternative possibilities offered by the QES models [17,20].…”
Section: Discussionmentioning
confidence: 99%
“…The last two terms on the right-hand side of eq. (197) are just cyclic permutations of the first. Henceforth, such terms occuring in any potential are referred to as "cyclic terms".…”
Section: Shape Invariance and 3-body Solvable Potentialsmentioning
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%