2008
DOI: 10.1088/0954-3899/35/6/063101
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A high-precision variational approach to three- and four-nucleon bound and zero-energy scattering states

Abstract: The hyperspherical harmonic (HH) method has been widely applied in recent times to the study of the bound states, using the Rayleigh-Ritz variational principle, and of low-energy scattering processes, using the Kohn variational principle, of A = 3 and 4 nuclear systems. When the wave function of the system is expanded over a sufficiently large set of HH basis functions, containing or not correlation factors, quite accurate results can be obtained for the observables of interest. In this paper, the main aspects… Show more

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Cited by 285 publications
(403 citation statements)
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“…It should be fairly straightforward to incorporate it in the few-nucleon calculations based on hyperspherical-harmonics expansion techniques favored by the Pisa group [66], or in the quantum Monte Carlo ones preferred by the ANL/ASU/JLab/LANL collaboration [18]. The Fortran computer program generating the potential will be made available upon request.…”
Section: Discussionmentioning
confidence: 99%
“…It should be fairly straightforward to incorporate it in the few-nucleon calculations based on hyperspherical-harmonics expansion techniques favored by the Pisa group [66], or in the quantum Monte Carlo ones preferred by the ANL/ASU/JLab/LANL collaboration [18]. The Fortran computer program generating the potential will be made available upon request.…”
Section: Discussionmentioning
confidence: 99%
“…The three-body problem was solved with the Hyperspherical Harmonics method, reviewed in Ref. [6]. The p − d scattering wave function with relative orbital angular momentum L , total spin S and total angular momentum J, is written as the sum of an internal and an asymptotic part…”
Section: Numerical Proceduresmentioning
confidence: 99%
“…Within the BHF approach the defect function should be calculated selfconsistently with the G matrices (17) and the single-particle potentials (19). Thus the average effective two-body force (21) should be calculated self-consistently and added to the bare NN force at each iterative step of the calculations. To simplify the numerical calculations and following [50,51], in the present work we use central correlation functions g(i,j ) independent on spin and isospin.…”
Section: A Inclusion Of Three-nucleon Forces In the Bhf Approachmentioning
confidence: 99%