Optimality of the rearrangement inequality with applications to Lorentz-type sequence spaces
Abstract
We characterize the sequences (wi)i=1∞ of non-negative numbers for which \[ Σi=1∞ ai wi is of the same order as n Σi=1n ai w1+n-i \] when (ai)i=1∞ runs over all non-increasing sequences of non-negative numbers. As a by-product of our work we settle a problem raised in [F. Albiac, Jose L. Ansorena and B. Wallis; arXiv:1703.07772[math.FA]] and prove that Garling sequences spaces have no symmetric basis.
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