Best Constants between Equivalent Norms in Lorentz Sequence Spaces

S. Barza; A. N. Marcoci; L. E. Persson

doi:10.1155/2012/713534

Journal of Function Spaces and Applications (Jan 2012)

Best Constants between Equivalent Norms in Lorentz Sequence Spaces

S. Barza,
A. N. Marcoci,
L. E. Persson

Affiliations

S. Barza: Department of Mathematics, Karlstad University, 65188 Karlstad, Sweden
A. N. Marcoci: Department of Mathematics and Computer Science, Technical University of Civil Engineering Bucharest, 020 396 Bucharest, Romania
L. E. Persson: Department of Mathematics, Luleå University of Technology, 97 187 Luleå, Sweden

DOI: https://doi.org/10.1155/2012/713534
Journal volume & issue: Vol. 2012

Abstract

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We find the best constants in inequalities relating the standard norm, the dual norm, and the norm ∥x∥(p,s):=inf⁡{∑k∥x(k)∥p,s}, where the infimum is taken over all finite representations x=∑kx(k) in the classical Lorentz sequence spaces. A crucial point in this analysis is the concept of level sequence, which we introduce and discuss. As an application, we derive the best constant in the triangle inequality for such spaces.

Published in Journal of Function Spaces and Applications

ISSN: 0972-6802 (Print)
Publisher: Hindawi Limited
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/9303

About the journal