Subdifferentiable functions satisfy Lusin properties of class C1 or C2

Abstract

Let f:Rn be a function. Assume that for a measurable set and almost every x∈ there exists a vector x∈Rn such that h 0f(x+h)-f(x)- x, h|h|2>-∞. Then we show that f satisfies a Lusin-type property of order 2 in , that is to say, for every >0 there exists a function g∈ C2(Rn) such that Ln(\x∈ : f(x)≠ g(x)\)≤. In particular every function which has a nonempty proximal subdifferential almost everywhere also has the Lusin property of class C2. We also obtain a similar result (replacing C2 with C1) for the Fr\'echet subdifferential. Finally we provide some examples showing that this kind of results are no longer true for "Taylor subexpansions" of higher order.