Physical and unphysical solutions of random-phase approximation equation

Abstract

Properties of solutions of the RPA equation is reanalyzed mathematically, which is defined as a generalized eigenvalue problem of the stability matrix S with the norm matrix N=diag.(1,-1). As well as physical solutions, unphysical solutions are examined in detail, with taking the possibility of Jordan blocks of the matrix N\,S into consideration. Two types of duality of eigenvectors and basis vectors of the Jordan blocks are pointed out and explored, which disclose many basic properties of the RPA solutions.