On the duality of the symmetric strong diameter 2 property in Lipschitz spaces
classification
🧮 math.FA
keywords
propertydiameterstrongsymmetricspacedualitylipschitzspaces
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We characterise the weak$^*$ symmetric strong diameter $2$ property in Lipschitz function spaces by a property of its predual, the Lipschitz-free space. We call this new property decomposable octahedrality and study its duality with the symmetric strong diameter $2$ property in general. For a Banach space to be decomposably octahedral it is sufficient that its dual space has the weak$^*$ symmetric strong diameter $2$ property. Whether it is also a necessary condition remains open.
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