V. P. Fonf, A. J. Pallares, R. J. Smith, S. Troyanski
Published 2013-02-01Version 1
The aim of this paper is to present two tools, Theorems 4 and 7, that make the task of finding equivalent polyhedral norms on certain Banach spaces easier and more transparent. The hypotheses of both tools are based on countable decompositions, either of the unit sphere S_X or of certain subsets of the dual ball of a given Banach space X. The su?cient conditions of Theorem 4 are shown to be necessary in the separable case. Using Theorem 7, we can unify two known results regarding the polyhedral renorming of certain C(K) spaces, and spaces having an (uncountable) unconditional basis. New examples of spaces having equivalent polyhedral norms are given in the fi?nal section.
Journal: Journa Functional Analysis 266 (1.1) 2014, pag. 247-264
Polyhedrality and decomposition
Extension of isometries from the unit sphere of a rank-2 Cartan factor
On Uniform Homeomorphisms of the Unit Spheres of Certain Banach Lattices
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