Regular Methods of Summability and the Banach-Saks Property for Double Sequences
Abstract
A Banach space $B$ is said to satisfy the Banach-Saks property with respect to a regular summability method if every bounded subsequence has a summable subsequence. We show that if a Banach space satisfies the Banach-Saks property with respect to a Robison-Hamilton regular summability method, for every bounded double sequence there exists a $\beta$-subsequence whose subsequences are all summable to the same limit.
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