Banach April 2010

banach@mathdept.okstate.edu

1 participants
22 discussions

Abstract of a paper by S.V. Astashkin, D.V. Zanin, E.M. Semenov, F.A. Sukochev
by alspach＠fourier.math.okstate.edu 02 Apr '10

02 Apr '10

This is an announcement for the paper "Kruglov operator and operators defined by random permutations" by S.V. Astashkin, D.V. Zanin, E.M. Semenov, and F.A. Sukochev. Abstract: The Kruglov property and the Kruglov operator play an important role in the study of geometric properties of r.i. function spaces. We prove that the boundedness of the Kruglov operator in a r.i. space is equivalent to the uniform boundedness on this space of a sequence of operators defined by random permutations. It is shown also that there is no minimal r.i. space with the Kruglov property. Archive classification: math.FA Mathematics Subject Classification: 46E30 Remarks: translated from original Russian text Submitted from: zani0005(a)csem.flinders.edu.au The paper may be downloaded from the archive by web browser from URL http://front.math.ucdavis.edu/1003.2009 or http://arXiv.org/abs/1003.2009

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Abstract of a paper by N.J. Kalton, F.A. Sukochev, and D.V. Zanin
by alspach＠fourier.math.okstate.edu 02 Apr '10

02 Apr '10

This is an announcement for the paper "Orbits in symmetric spaces, II by N.J. Kalton, F.A. Sukochev, and D.V. Zanin. Abstract: Suppose $E$ is fully symmetric Banach function space on $(0,1)$ or $(0,\infty)$ or a fully symmetric Banach sequence space. We give necessary and sufficient conditions on $f\in E$ so that its orbit $\Omega(f)$ is the closed convex hull of its extreme points. We also give an application to symmetrically normed ideals of compact operators on a Hilbert space. Archive classification: math.FA Mathematics Subject Classification: 46E30, 46B70, 46B20 Submitted from: zani0005(a)csem.flinders.edu.au The paper may be downloaded from the archive by web browser from URL http://front.math.ucdavis.edu/1003.1817 or http://arxiv.org/abs/1003.1817

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Banach April 2010