Lusin-type properties of convex functions and convex bodies

Abstract

We prove that if f:Rn is convex and A⊂Rn has finite measure, then for any >0 there is a convex function g:Rn of class C1,1 such that Ln(\x∈ A:\, f(x)≠ g(x)\)<. As an application we deduce that if W⊂Rn is a compact convex body then, for every >0, there exists a convex body W of class C1,1 such that Hn-1(∂ W ∂ W)< . We also show that if f:Rn is a convex function and f is not of class C1,1 loc, then for any >0 there is a convex function g:Rn of class C1,1 loc such that Ln(\x∈ Rn:\, f(x)≠ g(x)\)< if and only if f is essentially coercive, meaning that |x|∞f(x)-(x)=∞ for some linear function . A consequence of this result is that, if S is the boundary of some convex set with nonempty interior (not necessarily bounded) in Rn and S does not contain any line, then for every >0 there exists a convex hypersurface S of class C1,1loc such that Hn-1(S S)<.