A note on the strict sigularity of the inclusion between Nakano sequence spaces
Abstract
We characterize the strictly singular inclusions pnqn between Nakano sequence spaces providing a useful criterion, namely n→∞ pn-qn>0 (also recently obtained by Lang and Nekvinda in [12] with a different proof). It is also noted that no inclusion operator between Nakano sequence spaces is compact, neither L-weakly compact nor M-weakly compact. An easy criterion is given for the weak compactness of the inclusion.
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