An Elementary Proof for the Structure of Wasserstein Derivatives

Abstract

Let F: L2(, R) R be a law invariant and continuously Fr\'echet differentiable mapping. Based on Lions Lions, Cardaliaguet Cardaliaguet (Theorem 6.2 and 6.5) proved that: Derivative D F () = g(), where g: R R is a deterministic function which depends only on the law of . See also Carmona \& Delarue CD Section 5.2. In this short note we provide an elementary proof for this well known result. This note is part of our accompanying paper WZ, which deals with a more general situation.