Application of a theorem by bright to the generalized tracer system

Wave~~ctions which are sing& excited with respect to a given muIti~n~~~ation wa~fnnction in the sense of the pneralized Brillouin theorem are formed and the extended Cl problem is solved by variation or perturbation methods. After that the orbitais are properly contracted and the proess is repeated

A composition theorem proved recently by Joag-dev et al. (1995) is reformulated for quantile functions of distributions. The theorem is used to derive characterizations of the star order. As corollaries of the characterization theorem some inequalities for moments of order statistics from star order

The purpose of this paper is to provide an application of a non-compact version, due to Park, of Browder's fixed point theorem to generalized variational inequalities. In a non-compact setting, we establish a fairly general existence theorem on a generalized variational inequality using the result o

We introduce the following transform f(t) = j&J) K(w, t) P(o) dw with the Fourier-type inverse J'(o) = s p(t) K(w, t)fW dt. Unless otherwise indicated, the limits of integration are not finite and will be specified for the particular integral transform. The time-varying system function H(w, t) is d