Revisiting the hyperfine interval for the 2s2p 3\!PJ state in 9Be

Abstract

Using relativistic multiconfiguration Dirac-Hartree-Fock method, we calculate the hyperfine-structure properties of the 2s2p 3\!PJ state in 9Be. The hyperfine-structure properties encompass first-order hyperfine-structure parameters, as well as second-order and third-order corrections arising from the hyperfine mixing of different 2s2p 3\!PJ levels. Based on our theoretical results, we reanalyze the previously reported measurement of the hyperfine interval for the 2s2p 3\!P state in 9Be [A. G. Blachman and A. Lurio, Phys. Rev. 153, 164(1967)], yielding updated hyperfine-structure constants. Our results show that the hyperfine-structure constant B of 2s2p 3\!P1 is notably sensitive to second-order correction. Conversely, accurately determining the hyperfine-structure constant B of 2s2p 3\!P2 necessitates consideration of the hyperfine-structure constant C in the first-order hyperfine interaction equation. The updated hyperfine-structure constant B of the 2s2p 3\!P2 state is found to be 1.4542(67)~MHz, which is approximately 1.7\% larger than the previous value of 1.427(9)~MHz. By combining our theoretical results with the updated hyperfine-structure constant for the 2s2p 3\!P2 state, we extract the electric quadrupole moment Q of 9Be nucleus to be 0.05320(50)~b. This value is consistent with the most recent determination using the few-body precision calculation method. Additional, we also discuss the reasons for the discrepancy between the Q values obtained through few-body and previous many-body calculations.

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