Property (β) and uniform quotient maps
Abstract
In 1999, Bates, Johnson, Lindenstrauss, Preiss and Schechtman asked whether a Banach space that is a uniform quotient of p, 1 < p ≠ 2 < ∞, must be isomorphic to a linear quotient of p. We apply the geometric property (β) of Rolewicz to the study of uniform and Lipschitz quotient maps, and answer the above question positively for the case 1<p<2. We also give a necessary condition for a Banach space to have c0 as a uniform quotient.
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