Octahedral norms in free Banach lattices

Abstract

In this paper, we study octahedral norms in free Banach lattices FBL[E] generated by a Banach space E. We prove that if E is an L1(μ)-space, a predual of von Neumann algebra, a predual of a JBW*-triple, the dual of an M-embedded Banach space, the disc algebra or the projective tensor product under some hypothesis, then the norm of FBL[E] is octahedral. We get the analogous result when the topological dual E* of E is almost square. We finish the paper by proving that the norm of the free Banach lattice generated by a Banach space of dimension ≥ 2 is nowhere Fr\'echet differentiable. Moreover, we discuss some open problems on this topic.