Microscopic multicluster description of neutron-halo nuclei with a stochastic variational method
Abstract
To test a multicluster approach for halo nuclei, we give a unified description for the ground states of 6He and 8He in a model comprising an α cluster and single-neutron clusters. The intercluster wave function is taken a superposition of terms belonging to different arrangements, each defined by a set of Jacobi coordinates. Each term is then a superposition of products of gaussian functions of the individual Jacobi coordinates with different widths, projected to angular momenta l=0 or 1. To avoid excessively large dimensions and ``overcompleteness", stochastic methods were tested for selecting the gaussians spanning the basis. For 6He, we were able to calculate ground-state energies that are virtully exact within the subspace defined by the arrangements and l values, and we found that preselected random sets of bases (with or without simulated annealing) yield excellent numerical convergence to this ``exact" value with thoroughly truncated bases. For 8He good energy convergence was achieved in a state space comprising three arrangements with all l=0, and there are indications showing that the contributions of other subspaces are likely to be small. The 6He and 8He energies are reproduced by the same effective force very well, and the matter radii obtained are similar to those of other sophisticated calculations.
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