The convex hull of a Banach-Saks set
Abstract
A subset A of a Banach space is called Banach-Saks when every sequence in A has a Ces\`aro convergent subsequence. Our interest here focusses on the following problem: is the convex hull of a Banach-Saks set again Banach-Saks? By means of a combinatorial argument, we show that in general the answer is negative. However, sufficient conditions are given in order to obtain a positive result.
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