ON NUCLEAR SINGLE-PARTICLE POTENTIALS (Ⅱ) THE NONHERMITIAN CHOICE

  • The cancellation properties of the nonhermitian single-particle (SP) potential uαβ=Mαβεβ) [or Mαβεα)] according to the principle of maximal cancellation of perturbation diagrams are investigated in detail. The mass operator Mαβω) is separated into two parts Mαβonω) and Mαβoffω) as usual, however, a new criterion for their definition will be proposed. It is shown that the exact mass operator insertion is equal to the sum of the following three types of terms:(1) terms contributed by the poles of Mαβoffω). They are truly non-factorizable and must be considered separately,(2) terms which can be cancelled to all orders by the nonhermitian choice uαβ=Mαβεβ) [or Mαβεα)]. Hence, they serve to define uαβ,(3) the remaining terms, which can be summed to all orders in a simple way and may be interpreted as amplitude renormalization of the SP Green function.In order to illustrate the usefulness of the above results, we have considered the renormalized random phase approximation (RRPA) for the particle-hole Green function as an example. Related formulae are derived. In RRPA, not only the SP propagator renormalization which includes all the effects except those contributed by the poles of Mαβoffω), but also the off energy shell property of the G matrix elements have been taken into account.
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  • [1] P. J. Ellis, E. Osnes, Phys. Lett., 41B (1972), 97.[2] B. H. Brandow. Phys. Rev., 152 (1966), 863; Ann. of Phys., 57 (1970), 214.[3] M. W. Kirson, Nucl. Phys., A115 (1968), 49; A139 (1969), 57.[4] R. L. Becker, K. T. R. Davies, M.R. Patterson, Phys. Rev., C9 (1974), 1221.[5] R. W. Jones, F. Mohling, Nucl. Plys., A151 (1970), 420.[6] A. Klein, Phys. Rev., 121 (1960), 950.[7] R. W. Jones, F. Mohling, R. L. Becker, Nucl. Phys., A220 (1974), 45.[8] 昊式枢,物理学报,25 (1976), 433.[9] M. W. Kirson, Ann. of Phys., 66 (1971), 624; 82 (1974), 345.[10] 李政道、杨振宁,Phys. Rev., 117 (1960), 22.[11] S. Ethofer, P. Schuck, Z. Physik, 228 (1969), 264.[12] 吴式枢,物理学报,22(1966), 377.[13] P. Schuck, F. Villare, P. Ring, Nucl. Phys., A208 (1973), 302.[14] 吴式枢,中国科学,1973, 3, 255; 1974, 5, 471.
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Wu Shi-shu. ON NUCLEAR SINGLE-PARTICLE POTENTIALS (Ⅱ) THE NONHERMITIAN CHOICE[J]. Chinese Physics C, 1978, 2(1): 10-22.
Wu Shi-shu. ON NUCLEAR SINGLE-PARTICLE POTENTIALS (Ⅱ) THE NONHERMITIAN CHOICE[J]. Chinese Physics C, 1978, 2(1): 10-22. shu
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Received: 1977-06-06
Revised: 1900-01-01
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ON NUCLEAR SINGLE-PARTICLE POTENTIALS (Ⅱ) THE NONHERMITIAN CHOICE

  • Department of Physics, Jilin University

Abstract: The cancellation properties of the nonhermitian single-particle (SP) potential uαβ=Mαβεβ) [or Mαβεα)] according to the principle of maximal cancellation of perturbation diagrams are investigated in detail. The mass operator Mαβω) is separated into two parts Mαβonω) and Mαβoffω) as usual, however, a new criterion for their definition will be proposed. It is shown that the exact mass operator insertion is equal to the sum of the following three types of terms:(1) terms contributed by the poles of Mαβoffω). They are truly non-factorizable and must be considered separately,(2) terms which can be cancelled to all orders by the nonhermitian choice uαβ=Mαβεβ) [or Mαβεα)]. Hence, they serve to define uαβ,(3) the remaining terms, which can be summed to all orders in a simple way and may be interpreted as amplitude renormalization of the SP Green function.In order to illustrate the usefulness of the above results, we have considered the renormalized random phase approximation (RRPA) for the particle-hole Green function as an example. Related formulae are derived. In RRPA, not only the SP propagator renormalization which includes all the effects except those contributed by the poles of Mαβoffω), but also the off energy shell property of the G matrix elements have been taken into account.

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