Derivative Formulas in Measure on Riemannian Manifolds

Abstract

We characterise the link of derivatives in measure, which are introduced in [AKR,Card,ORS] respectively by different means, for functions on the space M of finite measures over a Riemannian manifold M. For a reasonable class of functions f, the extrinsic derivative DEf coincides with the linear functional derivative DFf, the intrinsic derivative DIf equals to the L-derivative DLf, and DIf(η)(x)= DLf(η)(x)= s 0 1 s ∇ f(η+s δ·)(x) = ∇ \DE f (η)\(x), \ \ (x,η)∈ M× M, where ∇ is the gradient on M, δx is the Dirac measure at x, and DEf(η)(x):= s 0 f(η+s δx)-f(η) s,\ \ x∈ M is the extrinsic derivative of f at η∈ M. This gives a simple way to calculate the intrinsic or L-derivative, and is extended to functions of probability measures. %This provides a simple way to calculate the intrinsic/Lions derivative.