On Weak Operator Compactness of the Unit Ball of L(H)

Using the M-structure theory, we show that several classical function spaces and spaces of operators on them fail to have points of weak-norm continuity for the identity map on the unit ball. This gives a unified approach to several results in the literature that establish the failure of strong geom

Bos and Liang have separately proved that the Kergin interpolants with respect to distinguished nodes on the unit disk are best approximations of the monomials in the infinity norm. These results are extended by characterizing the nodes as solutions of a system of nonlinear equations. Thus, it is po

We estimate the ideal measure of certain interpolated operators in terms of the measure of their restrictions to the intersection. The dual situation is also studied. Special attention is paid to the ideal of weakly compact operators. 1991 Mathematics Subject Classajication. 46B70, 46M35. Keywords

## Abstract We consider the canonical solution operator to $ \bar \partial $ restricted to (0, 1)‐forms with coefficients in the generalized Fock‐spaces equation image We will show that the canonical solution operator restricted to (0, 1)‐forms with $ {\cal F}{m} $‐coefficients can be interpreted

## Abstract The paper introduces a new class of two parameter non‐overdamped operator pencils arising from evolution equations. We investigate spectral properties, including variational principles for “interior” points of the spectrum. Examples leading to pencils of the new class are given. (© 2006