Differentiability of the argmin function and a minimum principle for semiconcave subsolutions
Abstract
Suppose f(x,y) + 2 \|x\|2 - σ2\|y\|2 is convex where σ>0, and the argmin function γ(x) = \ γ : ∈fy f(x,y) = f(x,γ)\ exists and is single valued. We will prove γ is differentiable almost everywhere. As an application we deduce a minimum principle for certain semiconcave subsolutions.
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