A quantitative version of Krein’s theorems for Fréchet spaces

Abstract: Kakol, J.; Kubzdela, A.; López Pellicer, M. (2013)Abstract. For a Banach space E and its bidual space E the following function k(H) := sup y∈H σ(E ,E ) infx∈E y−x defined on bounded subsets H of E measures how far H is from being σ(E, E )-relatively compact in E. This concept, introduced independently by Granero (2006) and Cascales-Marciszewski-Raja (2006), has been used to study a quantitative version of Krein's theorem for Banach spaces E and spaces Cp(K) over compact K. In the present paper a quantitative v… Show more

On the Mathematical Work of Professor Manuel López-Pellicer

On the Mathematical Work of Professor Manuel López-Pellicer

Some Aspects in the MathematicalWork of Jerzy K a̧ kol

Compactness and Distances to Spaces of Continuous Functions and Fréchet Spaces