Abstract
General formulae for a proton-neutron QRPA calculation are presented. All terms in the RPA order are retained, and no specific assumptions on the residual interaction and one-body charge-changing transitions are made. QRPA phonon correlations are introduced in first-order perturbation for quasiparticle transitions from odd-mass and odd-odd parent nuclei.
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References
Halbleib, J.A., Sorensen, R.A.: Nucl. Phys. A98, 542 (1967)
Cha, D.: Phys. Rev. C27, 2269 (1983)
Vogel, P., Zirnbauer, M.R.: Phys. Rev. Lett.57, 3148 (1986);
Engel, J., Vogel, P., Zirnbauer, M.R.: Phys. Rev. C37, 731 (1988)
Civitarese, O., Faessler, A., Tomoda, T.: Phys. Lett.194 B, 11 (1987); Tomoda, T., Faessler, A.: Phys. Lett.199 B,475 (1987)
Muto, K., Klapdor, H.V.: Phys. Lett.201 B, 420 (1988); Muto, K., Klapdor, H. V.: In: Neutrinos. Klapdor, H.V. (ed.), p 183–237. Berlin, Heidelberg, New York: Springer 1988
Kuzmin, V.A., Soloviev, V.G.: Nucl. Phys. A486, 118 (1988);
Soloviev, V.G.: Progr. Part. Nucl. Phys.19, 107 (1987)
Bender, E., Muto, K., Klapdor, H.V.: Phys. Lett.208 B, 53 (1988)
Klapdor, H.V.: Prog. Part. Nucl. Phys.17, 419 (1986)
Randrup, J.: Nucl. Phys. A207, 209 (1973); Licentiat thesis (unpublished)
Krumlinde, J., Möller, P.: Nucl. Phys. A417, 419 (1984)
Bloch, C., Messiah, A.: Nucl. Phys.39, 95 (1962)
Ring, P., Schuck, P.: The nuclear many-body problem. Berlin, Heidelberg, New York: Springer 1980