A quantitative version of James' compactness theorem

Abstract

We introduce two measures of weak non-compactness JaE and Ja that quantify, via distances, the idea of boundary behind James' compactness theorem. These measures tell us, for a bounded subset C of a Banach space E and for given x*∈ E*, how far from E or C one needs to go to find x**∈ Cw*⊂ E** with x**(x*)= x* (C). A quantitative version of James' compactness theorem is proved using JaE and Ja, and in particular it yields the following result: Let C be a closed convex bounded subset of a Banach space E and r>0. If there is an element x0** in Cw* whose distance to C is greater than r, then there is x*∈ E* such that each x**∈Cw* at which x*(C) is attained has distance to E greater than r/2. We indeed establish that JaE and Ja are equivalent to other measures of weak non-compactness studied in the literature. We also collect particular cases and examples showing when the inequalities between the different measures of weak non-compactness can be equalities and when the inequalities are sharp.