Nonsmooth Morse-Sard theorems
Abstract
We prove that every function f:Rn R satisfies that the image of the set of critical points at which the function f has Taylor expansions of order n-1 and non-empty subdifferentials of order n is a Lebesgue-null set. As a by-product of our proof, for the proximal subdifferential ∂P, we see that for every lower semicontinuous function f:R2 the set f(\x∈R2 : 0∈∂Pf(x)\) is L1-null.
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