Copyright © 2011 Berta Gamboa de Buen and Fernando Núñez-Medina. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

We study the fixed point property (FPP) in the Banach space with the equivalent norm . The space with this norm has the weak fixed point property. We prove that every infinite-dimensional subspace of contains a complemented asymptotically isometric copy of , and thus does not have the FPP, but there exist nonempty closed convex and bounded subsets of which are not -compact and do not contain asymptotically isometric —summing basis sequences. Then we define a family of sequences which are asymptotically isometric to different bases equivalent to the summing basis in the space and we give some of its properties. We also prove that the dual space of over the reals is the Bynum space and that every infinite-dimensional subspace of does not have the fixed point property.