Explicit models of 1-preduals and the weak* fixed point property in 1

Abstract

We provide a concrete isometric description of all the preduals of 1 for which the standard basis in 1 has a finite number of w*-limit points. Then, we apply this result to give an example of an 1-predual X such that its dual X* lacks the weak* fixed point property for nonexpansive mappings (briefly, w*-FPP), but X does not contain an isometric copy of any hyperplane Wα of the space c of convergent sequences such that Wα is a predual of 1 and Wα* lacks the w*-FPP. This answers a question left open in the 2017 paper of the present authors.