We have performed self-consistent Brueckner-Hartree-Fock (BHF) and itsrenormalized theory to the structure calculations of finite nuclei. The$G$-matrix is calculated within the BHF basis, and the exact Pauli exclusionoperator is determined by the BHF spectrum. Self-consistent occupationprobabilities are included in the renormalized Brueckner-Hartree-Fock (RBHF).Various systematics and convergences are studies. Good results are obtained forthe ground-state energy and radius. RBHF can give a more reasonablesingle-particle spectrum and radius. We present a first benchmark calculationwith other {it ab initio} methods using the same effective Hamiltonian. Wefind that the BHF and RBHF results are in good agreement with other $it{ab}$$it{initio}$ methods.
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机译:我们已经对有限核的结构计算进行了自我一致的Brueckner-Hartree-Fock(BHF)和氏肾上腺化理论。 $ G $ -MATRIX在BHF基础内计算,并且精确的Pauli排除符由BHF频谱决定。自我一致的占领性占用性包含在Renormalized Brueckner-Hartree-Fock(RBHF)中。漫命的系统性和收敛性是研究。基地能量和半径获得了良好的结果。 RBHF可以给出更合理的粒子谱和半径。我们使用相同的哈密顿人的其他{ IT AB Initio}方法提供了第一个基准计算。 WEFind认为,BHF和RBHF结果与其他$ IT {AB} $$ IT {INITIO} $方法吻合良好。
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