JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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The Dual Spaces of the Sets of Difference Sequences of Order $m$


	Authors:	C.A. Bektas, Mikhail Et,
	Keywords:	Difference sequences, $alpha -$, $beta -$ and $gamma -$duals.
	Date Received:	16/12/05
	Date Accepted:	07/01/06
	Subject Codes:	40C05, 46A45.
	Editors:	Alexander G. Babenko,


	Abstract:	The idea of difference sequence spaces was introduced by Kizmaz [5] and the concept was generalized by Et and Çolak [3]. Let $p=(p_{k})$ be a bounded sequence of positive real numbers and $v=(v_{k})$ be any fixed sequence of non-zero complex numbers. If $x=(x_{k})$ is any sequence of complex numbers we write $Delta _{v}^{m}x$ for the sequence of the -th order differences of and $Delta _{v}^{m}(X)={x=(x_{k}):Delta _{v}^{m}xin X}$ for any set of sequences. In this paper we determine the -, - and - duals of the sets $Delta _{v}^{m}(X)$ which are defined by Et et al. [2] for $X=ell _{infty }(p)$ , and $c_{0}(p).$ This study generalizes results of Malkowsky [9] in special cases. ;

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