Geometry of unit balls of free Banach lattices, and its applications

Abstract

We begin by describing the unit ball of the free p-convex Banach lattice over a Banach space E (denoted by FBL(p)[E]) as a closed solid convex hull of an appropriate set. Based on it, we show that, if a Banach space E has the λ-Approximation Property, then FBL(p)[E] has the λ-Positive Approximation Property. Further, we show that operators u ∈ B(E,F) (where E and F are Banach spaces) which extend to lattice homomorphisms from FBL(q)[E] to FBL(p)[F] are precisely those whose adjoints are (q,p)-mixing. Related results are also obtained for free lattices with an upper p-estimate.