Free Banach lattices generated by a lattice and projectivity

Abstract

In this article we deal with the free Banach lattice FBL L generated by a lattice L. We prove that if FBL L is projective then L has a maximum and a minimum. On the other hand, we show that if L has maximum and minimum then FBL L is 2-lattice isomorphic to a C(K)-space. As a consequence, FBL L is projective if and only if it is lattice isomorphic to a C(K)-space with K being an absolute neighborhood retract. As an application, we characterize those linearly ordered sets and Boolean algebras for which the corresponding free Banach lattice is projective.