Many-body Systems Interacting via a Two-body Random Ensemble (I): Angular Momentum distribution in the ground states

Details Many-body Systems Interacting via a Two-body Random Ensemble (I): Angular Momentum distribution in the ground states Many-body Systems Interacting via a Two-body Random Ensemble (I): Angular Momentum distribution in the ground states

2002-06-18

arxiv.org/abs/nucl-th/0206040v1

Phys.Rev. C66 (2002) 064322

Physics

Nuclear Physics

Nuclear Theory

39 pages and 8 figures

Scientific paper

10.1103/PhysRevC.66.064322

In this paper, we discuss the angular momentum distribution in the ground states of many-body systems interacting via a two-body random ensemble. Beginning with a few simple examples, a simple approach to predict P(I)'s, angular momenta I ground state (g.s.) probabilities, of a few solvable cases, such as fermions in a small single-j shell and d boson systems, is given. This method is generalized to predict P(I)'s of more complicated cases, such as even or odd number of fermions in a large single-j shell or a many-j shell, d-boson, sd-boson or sdg-boson systems, etc. By this method we are able to tell which interactions are essential to produce a sizable P(I) in a many-body system. The g.s. probability of maximum angular momentum $I_{max}$ is discussed. An argument on the microscopic foundation of our approach, and certain matrix elements which are useful to understand the observed regularities, are also given or addressed in detail. The low seniority chain of 0 g.s. by using the same set of two-body interactions is confirmed but it is noted that contribution to the total 0 g.s. probability beyond this chain may be more important for even fermions in a single-j shell. Preliminary results by taking a displaced two-body random ensemble are presented for the I g.s. probabilities.

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