The lattice Sch\"affer constant

Abstract

For a Banach lattice X, its lattice Sch\"affer constant is defined by: gather* λ+(X)=∈f\\\|x+y\|,\|x-y\|\\,\,\|x\|=\|y\|=1,x,y≥0\. gather* In this paper, we investigate this constant, as well as the companion parameter gather* β(X)=∈f\\|x y\|\,\,\|x\|=\|y\|=1, x,y≥0 and x y=0\. gather* Our main results fall into two groups. (1) We link the behavior of the parameters λ+ and β to the global properties of the lattice X. For instance, we prove that (i) if λ+(X)>1, then the Banach lattice X is a KB-space, and moreover, it satisfies a lower q-estimate for some q∈(1,∞); (ii) λ+(X)=1 if and only if X contains lattice-almost isometric copies of ∞2; and (iii) that λ+(X)=2 if and only if X is an abstract L-space. (2) We establish inequalities relating λ+(X) to the characteristics of monotonicity, 0,m(X) and 0,m(X). Along the way, we compute λ+(X) and β(X) for various Banach lattices X.