Various sum rules for multiple giant dipole resonance states are derived. For the triple giant dipole resonance states, the energy-weighted sum of the transition strengths requires a model to be related to those of the single and double giant dipole resonance states. It is also shown that the non-diagonal matrix elements of the double commutator between the dipole operator and the nuclear Hamiltonian give useful identities for the excitation energy and transition strength of each excited state. Using those identities, the relationship between width of the single dipole state and those of the multiple ones is qualitatively discussed. These results, it is stressed, may be useful in the study of other systems than dipole excitations in nuclei, as well as in the problem of anharmonicities of collective motions.
Sum rules of the multiple giant resonance states / H. Kurasawa, T. Suzuki, P.F. Bortignon. - In: PROGRESS OF THEORETICAL PHYSICS. - ISSN 0033-068X. - 114:4(2005), pp. 805-812.
Sum rules of the multiple giant resonance states
P.F. BortignonUltimo
2005
Abstract
Various sum rules for multiple giant dipole resonance states are derived. For the triple giant dipole resonance states, the energy-weighted sum of the transition strengths requires a model to be related to those of the single and double giant dipole resonance states. It is also shown that the non-diagonal matrix elements of the double commutator between the dipole operator and the nuclear Hamiltonian give useful identities for the excitation energy and transition strength of each excited state. Using those identities, the relationship between width of the single dipole state and those of the multiple ones is qualitatively discussed. These results, it is stressed, may be useful in the study of other systems than dipole excitations in nuclei, as well as in the problem of anharmonicities of collective motions.
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