EUDML

Currently displaying 1 – 6 of 6

Order by Relevance | Title | Year of publication

Are some optimal shape problems convex?

Kawohl, Bernd; Lang, Jan — 1997

Journal of Convex Analysis

Traces of a weighted Sobolev space in a singular case

Jan Lang; Aleš Nekvinda — 1995

Czechoslovak Mathematical Journal

A difference between continuous and absolutely continuous norms in Banach function spaces

Jan Lang; Aleš Nekvinda — 1997

Czechoslovak Mathematical Journal

On examples we show a difference between a continuous and absolutely continuous norm in Banach function spaces.

Zobecněné trigonometrické funkce z různých úhlů pohledu

David Eric Edmunds; Jan Lang — 2009

Pokroky matematiky, fyziky a astronomie

Explicit representation of compact linear operators in Banach spaces via polar sets

David E. Edmunds; Jan Lang — 2013

Studia Mathematica

We consider a compact linear map T acting between Banach spaces both of which are uniformly convex and uniformly smooth; it is supposed that T has trivial kernel and range dense in the target space. It is shown that if the Gelfand numbers of T decay sufficiently quickly, then the action of T is given by a series with calculable coefficients. This provides a Banach space version of the well-known Hilbert space result of E. Schmidt.

Series representation of compact linear operators in Banach spaces

David E. Edmunds; Jan Lang — 2016

Commentationes Mathematicae

Let $p \in (1, \infty)$ and $I = (0, 1)$ ; suppose that $T : L_{p} (I) \to L_{p} (I)$ is a compact linear map with trivial kernel and range dense in $L_{p} (I)$ . It is shown that if the Gelfand numbers of $T$ decay sufficiently quickly, then the action of $T$ is given by a series with calculable coefficients. The special properties of $L_{p} (I)$ enable this to be established under weaker conditions on the Gelfand numbers than in earlier work set in the context of more general spaces.

Page 1

Download Results (CSV)

Advanced Search