Strong Klee-And\o Theorems through an Open Mapping Theorem for cone-valued multi-functions

Abstract

A version of the classical Klee-And\o Theorem states the following: For every Banach space X, ordered by a closed generating cone C⊂eq X, there exists some α>0 so that, for every x∈ X, there exist x∈ C so that x=x+-x- and \|x+\|+\|x-\|≤α\|x\|. The conclusion of the Klee-And\o Theorem is what is known as a conormality property. We prove stronger and somewhat more general versions of the Klee-And\o Theorem for both conormality and coadditivity (a property that is intimately related to conormality). A corollary to our result shows that the functions x x, as above, may be chosen to be bounded, continuous, and positively homogeneous, with a similar conclusion yielded for coadditivity. Furthermore, we show that the Klee-And\o Theorem generalizes beyond ordered Banach spaces to Banach spaces endowed with arbitrary collections of cones. Proofs of our Klee-And\o Theorems are achieved through an Open Mapping Theorem for cone-valued multi-functions/correspondences. We very briefly discuss a potential further strengthening of The Klee-And\o Theorem beyond what is proven in this paper, and motivate a conjecture that there exists a Banach space X, ordered by a closed generating cone C⊂eq X, for which there exist no Lipschitz functions (·):X C satisfying x=x+-x- for all x∈ X.