Injective spaces of real-valued functions with the baire property

Generalizing the technique used by S.A. Argyros in [3], we give a lemma from which certain Banach spaces are shown to be non-injective. This is applied mainly to study the injectivity of spaces of real-valued Borel functions and functions with the Baire property on a topological space. The results obtained in this way do not follow from previous works about this matter.

Oxidative Stress and Chronic Inflammatory State Present in Familial Hypercholesterolemia is Reduced After a Fat Overload Rich in Unsaturated Fatty Acids

On constructing injective spaces of type C(K)

Abstract In this paper we give a general method to construct averaging operators from which we obtain almost all known methods to obtain injective spaces of type C(K). From this point of view, some known constructions are better understood and they can be easily generalized and simplified, and we also obtain some new examples of injective spaces that have not been considered before.

A note on lower bounds of norms of averaging operators

For any natural number n we obtain some examples of continuous onto maps $\phi : S\,\,\longrightarrow\, \,T$ for which Ditor's set $\Delta _\phi ^2(2, 2)$ is empty but every averaging operator for $\phi $ has norm greater or equal to 2n + 1.