Nondissipative curves in Hilbert spaces having a limit of the corresponding correlation function (Q5943635)

The authors consider a class of nondissipative basic operators, denoted by \(\widetilde\Omega_R\), that are a coupling of a dissipative operator and an antidissipative one. Associated with the family \(\widetilde\Omega_R\), a class of nondissipative curves in Hilbert spaces, whose correlation functions have limits at \(\pm\infty\), is presented. The work under review is a continuation and a generalization of some investigations due to \textit{K. Kirichev} and \textit{V. Zolotarev} [see Integral Equations Oper. Theory 19, No. 4, 447-457 (1994; Zbl 0886.60027) and ibid. 19, No. 3, 270-289 (1994; Zbl 0805.60031)] on the model representations of curves in Hilbert spaces where the corresponding semigroup generator is a dissipative operator. Among other results, the wave operators and the scattering operator for the couple \((A,A^*),A\in\widetilde\Omega_R\), are obtained, The authors' results show an interesting phenomenon: the nondissipative case under discussion is near to a dissipative one.