On the complete separation of unique 1 spreading models and the Lebesgue property of Banach spaces
Abstract
We construct a reflexive Banach space XD with an unconditional basis such that all spreading models admitted by normalized block sequences in XD are uniformly equivalent to the unit vector basis of 1, yet every infinite-dimensional closed subspace of XD fails the Lebesgue property. This is a new result in a program initiated by Odell in 2002 concerning the strong separation of asymptotic properties in Banach spaces.
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