Global approximation of convex functions by differentiable convex functions on Banach spaces

Abstract

We show that if X is a Banach space whose dual X* has an equivalent locally uniformly rotund (LUR) norm, then for every open convex U⊂eq X, for every >0, and for every continuous and convex function f:U → R (not necessarily bounded on bounded sets) there exists a convex function g:X → R of class C1(U) such that f-≤ g≤ f on U. We also show how the problem of global approximation of continuous (not necessarily bounded on bounded sets) and convex functions by Ck smooth convex functions can be reduced to the problem of global approximation of Lipschitz convex functions by Ck smooth convex functions.