Lattice embeddings in free Banach lattices over lattices

Abstract

In this article we deal with the free Banach lattice generated by a lattice and its behavior with respect to subspaces. In general, any lattice embedding i L M between two lattices L ⊂eq M induces a Banach lattice homomorphism FBL L FBL M between the corresponding free Banach lattices. We show that this mapping might not be an isometric embedding neither an isomorphic embedding. In order to provide sufficient conditions for to be an isometric embedding we define the notion of locally complemented lattices and prove that, if L is locally complemented in M, then yields an isometric lattice embedding from FBL L into FBL M. We provide a wide number of examples of locally complemented sublattices and, as an application, we obtain that every free Banach lattice generated by a lattice is lattice isomorphic to an AM-space or, equivalently, to a sublattice of a C(K)-space. Furthermore, we prove that is an isomorphic embedding if and only if it is injective, which in turn is equivalent to the fact that every lattice homomorphism x* L [-1,1] extends to a lattice homomorphism x* M [-1,1]. Using this characterization we provide an example of lattices L ⊂eq M for which is an isomorphic not isometric embedding.