Large Banach spaces with no infinite equilateral sets
Abstract
A subset of a Banach space is called equilateral if the distances between any two of its distinct elements are the same. It is proved that there exist non-separable Banach spaces (in fact of density continuum) with no infinite equilateral subset. These examples are strictly convex renormings of 1([0,1]). A wider class of renormings of 1([0,1]) which admit no uncountable equilateral sets is also considered.
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