Ball generated property of direct sums of Banach spaces
Abstract
A Banach space X is said to have the ball generated property (BGP) if every closed, bounded, convex subset of X can be written as an intersection of finite unions of closed balls. In 2002 S. Basu proved that the BGP is stable under (infinite) c0- and p-sums for 1<p<∞. We will show here that for any absolute, normalised norm \|·\|E on R2 satisfying a certain smoothness condition the direct sum XE Y of two Banach spaces X and Y with respect to \|·\|E enjoys the BGP whenever X and Y have the BGP.
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