On Geometric Constants for Discrete Morrey Spaces
In this paper we prove that the n-th Von Neumann-Jordan constant and the n-th James constant for discrete Morrey spaces lpq where 1≤p<q<∞ are both equal to n. This result tells us that the discrete Morrey spaces are not uniformly non-l1, and hence they are not uniformly n-convex.
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2008 ◽
Vol 338
(2)
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pp. 1494
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2010 ◽
Vol 23
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pp. 277-281
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2007 ◽
Vol 333
(2)
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pp. 950-958
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2009 ◽
Vol 357
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pp. 98-102
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2019 ◽