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On the Relative Strength of Two Absolute Summability Methods

Hüsey i̇n Bor
Proceedings of the American Mathematical Society
Vol. 113, No. 4 (Dec., 1991), pp. 1009-1012
DOI: 10.2307/2048776
Stable URL: http://www.jstor.org/stable/2048776
Page Count: 4
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Since scans are not currently available to screen readers, please contact JSTOR User Support for access. We'll provide a PDF copy for your screen reader.
On the Relative Strength of Two Absolute Summability Methods
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Abstract

In this paper we prove a theorem concerning the relative strength of |R, pn|k and |R, qn|k summability methods, $k > 1$, that generalizes a result of Bosanquet [1].

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