JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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A Generalization of Hölder and Minkowski Inequalities


	Authors:	Yılmaz Yilmaz, M. Kemal Özdemır, İhsan Solak,
	Keywords:	Inequalities, Hölder, Minkowski, Sequence algebra, Vector-valued sequence space.
	Date Received:	29/06/06
	Date Accepted:	09/11/06
	Subject Codes:	Pri 26D15, 47A30; Sec 46A45.
	Editors:	Kazimierz Nikodem,


	Abstract:	In this work, we give a generalization of Hölder and Minkowski inequalities to normal sequence algebras with absolutely monotone seminorm. Our main result is Theorem 2.1 and Theorem 2.2 which state these extensions. Taking $F=ell_{1}$ and ${leftVert {cdot }rightVert }_{F}={leftVert {cdot}rightVert }_{1}$ in both these theorems, we obtain classical versions of these inequalities. Also, using these generalizations we construct the vector-valued sequence space as a paranormed space which is a most general form of the space $c_{0}left( X,lambda,pright)$ investigated in [6].;

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