Moments and Legendre-Fourier Series for Measures Supported on Curves

Abstract

Some important problems (e.g., in optimal transport and optimal control) have a relaxed (or weak) formulation in a space of appropriate measures whichis much easier to solve. However, an optimal solution μ of the latter solves the former if and only if the measure μ is supported on a "trajectory" \(t,x(t)) t∈ [0,T]\ for some measurable function x(t). We provide necessary and sufficient conditions on moments (γ\ij) of a measure dμ(x,t) on [0,1]2 to ensure that μ is supported on a trajectory \(t,x(t)) t∈ [0,1]\. Those conditions are stated in terms of Legendre-Fourier coefficients f\j=( f\j(i)) associated with some functions f\j [0,1] R, j=1,…, where each f\j is obtained from the moments γ\ji, i=0,1,…, of μ.