The spectral approximation of multiplication operators via asymptotic (structured) linear algebra

We study the asymptotic behavior of the minimal cost of computing an \(\varepsilon\)-approximation to linear continuous operators, as \(\varepsilon \rightarrow 0^{+}\). An approximation is computed based on perturbed values of linear and continuous functionals which can be chosen adaptively. Obtaini

## R&urn& We study the asymptotic behaviour of several non-linear functionals of the empirical bridge and obtain some applications to G-deviation in density estimation and to Kullback deviation convergence. 0 AcadtZmie des Sciences/Elsevier, Paris

The present Part V of this series of articles is devoted to the initial development of the theory of generalized repeat space for a study of the correlation between the structure and properties in molecules having many identical moieties. An element of generalized repeat space, referred to as a gene

By extending the methodology given in Parts I and II of this series of articles, certain dynamical systems of chemical kinetic equations are analyzed in the Ž . setting of the Banach algebra B B B of all bounded operators acting on a Banach space Ž . B B. In this article, we proceed from the general

Part IV of this series consists of two complementary subparts devoted to Ž . attain the following two goals: i By shifting from the previous setting of the Banach Ž . Ž . Ž . algebra B B B s B B B, B B to a broader setting of the space B X, B B of all bounded linear operators from a normed space X t