Abstract
The Brueckner-Goldstone nuclear matter theory is employed to calculate the binding energy of liquid 3He by presenting the calculations in a coherent fashion — choosing uniform mesh for integration points and adopting the established experimental values of input parameters. The uniqueness of the binding energy is achieved by constraining the energy gap parameter so as to produce its self-consistent solutions. Of the Frost-Musulin, Lennard-Jones and Yntema-Schneider potentials, binding energy obtained in the first one is found to be the best.
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