Monge-Kantorovitch Measure Transportation and Monge-Ampère Equation on Wiener Space

Abstract: Let (W, µ, H ) be an abstract Wiener space assume two ν i , i = 1, 2 probabilities on (W, B(W )) 1 . We give some conditions for the Wasserstein distance between ν 1 and ν 2 with respect to the Cameron-Martin spaceto be finite, where the infimum is taken on the set of probability measures β on W × W whose first and second marginals are ν 1 and ν 2 . In this case we prove the existence of a unique (cyclically monotone) map T = I W + ξ , with ξ : W → H , such that T maps ν 1 to ν 2 . Moreover, if ν 2 µ 2 , then… Show more

“…We shall denote this optimal transport map by t ν µ . This is one of the infinite-dimensional generalizations (see also [15] for another result in Wiener spaces) of the finite-dimensional result ensuring that whenever µ ∈ P 2 (R k ) is absolutely continuous with respect to L k , then there exists a unique optimal transport map that is also the gradient of a convex function.…”

Existence and stability for Fokker–Planck equations with log-concave reference measure

“…We shall denote this optimal transport map by t ν µ . This is one of the infinite-dimensional generalizations (see also [15] for another result in Wiener spaces) of the finite-dimensional result ensuring that whenever µ ∈ P 2 (R k ) is absolutely continuous with respect to L k , then there exists a unique optimal transport map that is also the gradient of a convex function.…”

Existence and stability for Fokker–Planck equations with log-concave reference measure

“…Of particular interest is the result of [15], later extended by [55], which shows that when c(x, T (x)) is quadratic and µ ref is atomless, the optimal transport map exists and is unique; moreover this map is the gradient of a convex function and thus is monotone. Generalizations of this result accounting for different cost functions and spaces can be found in [19,2,27,11]. For a thorough contemporary development of optimal transport we refer to [88,87].…”

“…Thus, z * can be computed recursively via a sequence of n one-dimensional root-finding problems. Monotonicity of the triangular maps guarantees that (27) has a unique real solution for each k and any given x * . Here, one can use any off-the-shelf rootfinding algorithm [65].…”

“…to clean up the approximation of the root z * obtained from the recursive algorithm (27). An alternative way to evaluate the direct transport is to build a parametric representation of T itself via standard regression techniques.…”

Sampling via Measure Transport: An Introduction

“…In particular, fruitful relations between these problems, nonlinear transformations of measures, nonlinear differential equations and nonlinear functional inequalities have been revealed (see [1], [3], [4], [8], [9], [10], [11], [12], [13], [14], [15], [17], [18], [20], [21], [23], [24], [26], [28], [29], where one can find additional references). We recall that the general Monge problem deals with measurable mappings T from a given probability space (X, A, µ) to a probability space (Y, B, ν) that transform µ into ν and minimize the integrals In this work, we consider a more general problem when a mapping T = I + F , where I(x) = x, transforms a measure µ into a measure g · µ and one is interested in the integrability of functions of |F | under appropriate integrability assumptions on g. An interesting result in this direction is due to Fernique [16] who considered a Gaussian measure γ on a separable Fréchet space and a probability measure g·γ such that g ∈ L p (γ) for some p > 1.…”

Integrability of Absolutely Continuous Transformations of Measures and Applications to Optimal Mass Transportation