On the global shape of continuous convex functions on Banach spaces

Abstract

We make some remarks on the global shape of continuous convex functions defined on a Banach space Z. Among other results we prove that if Z is separable then for every continuous convex function f:Z there exist a unique closed linear subspace Yf of Z such that, for the quotient space Xf :=Z/Yf and the natural projection π:Z Xf, the function f can be written in the form f(z)=(π(z)) +(z) for all z∈ Z, where f∈ X* and :Xf is a convex function such that t∞(x+tv)=∞ for every x, v∈ Xf with v≠ 0. This kind of result is generally false if Z is nonseparable (even in the Hilbertian case Z=2() with an uncountable set).