Pointwise compactness and weakly compact sets inLE∞

We use properties of Day's norm on c 0 (}) to prove that, for every Eberlein compact space K, there exists a separately continuous symmetric mapping d: K\_K Ä R such that we have d(x, y)< d(x, x)+d( y, y) 2 for any two distinct points x and y of K. As a consequence, we have that every Eberlein compa

The class of weakly compact operators is, as well as the class of compact operators, a fundamental operator ideal. They were investigated strongly in the last twenty years. In this survey, we have collected and ordered some of this (partly very new) knowledge. We have also included some comments, re

In this paper, we prove that every isometry from a nonempty weakly compact convex set K into itself fixes a point in the Chebyshev center of K, provided K satisfies the hereditary fixed point property for isometries. In particular, all isometries from a nonempty bounded closed convex subset of a uni