Banach lattices with upper p-estimates: free and injective objects

Abstract

We study the free Banach lattice FBL(p,∞)[E] with upper p-estimates generated by a Banach space E. Using a classical result of Pisier on factorization through Lp,∞(μ) together with a finite dimensional reduction, it is shown that the spaces p,∞(n) witness the universal property of FBL(p,∞)[E] isomorphically. As a consequence, we obtain a functional representation for FBL(p,∞)[E]. More generally, our proof allows us to identify the norm of any free Banach lattice over E associated with a rearrangement invariant function space. After obtaining the above functional representation, we take the first steps towards analyzing the fine structure of FBL(p,∞)[E]. Notably, we prove that the norm for FBL(p,∞)[E] cannot be isometrically witnessed by Lp,∞(μ) and settle the question of characterizing when an embedding between Banach spaces extends to a lattice embedding between the corresponding free Banach lattices with upper p-estimates. To prove this latter result, we introduce a novel push-out argument, which when combined with the injectivity of p allows us to give an alternative proof of the subspace problem for free p-convex Banach lattices. On the other hand, we prove that p,∞ is not injective in the class of Banach lattices with upper p-estimates, elucidating one of many difficulties arising in the study of FBL(p,∞)[E].