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Korovkin-type convergence results for non-positive operators

Oliver Nowak (2010)

Open Mathematics

Korovkin-type approximation theory usually deals with convergence analysis for sequences of positive operators. In this work we present qualitative Korovkin-type convergence results for a class of sequences of non-positive operators, more precisely regular operators with vanishing negative parts under a limiting process. Sequences of that type are called sequences of almost positive linear operators and have not been studied before in the context of Korovkin-type approximation theory. As an example...

L p -convergence of Bernstein-Kantorovich-type operators

Michele Campiti, Giorgio Metafune (1996)

Annales Polonici Mathematici

We study a Kantorovich-type modification of the operators introduced in [1] and we characterize their convergence in the L p -norm. We also furnish a quantitative estimate of the convergence.

Minimal projections with respect to various norms

Asuman Güven Aksoy, Grzegorz Lewicki (2012)

Studia Mathematica

A theorem of Rudin permits us to determine minimal projections not only with respect to the operator norm but with respect to various norms on operator ideals and with respect to numerical radius. We prove a general result about N-minimal projections where N is a convex and lower semicontinuous (with respect to the strong operator topology) function and give specific examples for the cases of norms or seminorms of p-summing, p-integral and p-nuclear operator ideals.

Currently displaying 61 – 80 of 148