Aspects of the uniform λ-property
Abstract
If Z is a uniformly convex normed space, the quotient space 
, which is not strictly convexifiable, is shown to have the unifonn λ -property and its 
-function is calculated. An example is given of a Banach space X with a closed linear subspace Y such that Y and 
and strictly convex, yet X fails to have the λ- property. Convex sequences which generate 
are characterized.
, which is not strictly convexifiable, is shown to have the unifonn λ -property and its -function is calculated. An example is given of a Banach space X with a closed linear subspace Y such that Y and and strictly convex, yet X fails to have the λ- property. Convex sequences which generate are characterized.DOI Code:
10.1285/i15900932v12p157
Keywords:
Extreme point; Strict convexity; λ-property; Uniform convexity
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