Eigenphase shift decomposition of the RPA strength function based on the Jost-RPA method

Abstract

The S-matrix which satisfies the unitarity, giving the poles as RPA excited states, is derived using the extended Jost function within the framework of the RPA theory. An analysis on the correspondence between the component decomposition of the RPA strength function by the eigenphase shift obtained by diagonalisation of the S-matrix and the S- and K-matrix poles was performed in the calculation of the 16O quadrupole excitations. The results show the possibility that the states defined by the eigenphase shift can be expressed as RPA-excited eigenstates corresponding to the S-matrix poles in the continuum region.