On continuity equations in infinite dimensions with non-Gaussian reference measure

Abstract

Let γ be a Gaussian measure on a locally convex space and H be the corresponding Cameron-Martin space. It has been recently shown by L. Ambrosio and A. Figalli that the linear first-order PDE + divγ ( · b) =0, \ \ |t=0 = 0, where 0 · γ is a probability measure, admits a weak solution, in particular, under the following assumptions: \|b\|H ∈ Lp(γ), \ p>1, \ \ \ (( divγ b)- ) ∈ L1(γ). Applying transportation of measures via triangular maps we prove a similar result for a large class of non-Gaussian probability measures on ∞, under the main assumption that βi ∈ n ∈ Ln() for every i ∈ , where βi is the logarithmic derivative of along the coordinate xi. We also show uniqueness of the solution for a wide class of measures. This class includes uniformly log-concave Gibbs measures and certain product measures. measures.