Fast Algorithms for a New Relaxation of Optimal Transport

Abstract

We introduce a new class of objectives for optimal transport computations of datasets in high-dimensional Euclidean spaces. The new objectives are parametrized by ≥ 1, and provide a metric space R(·, ·) for discrete probability distributions in Rd. As approaches 1, the metric approaches the Earth Mover's distance, but for larger than (but close to) 1, admits significantly faster algorithms. Namely, for distributions μ and supported on n and m vectors in Rd of norm at most r and any ε > 0, we give an algorithm which outputs an additive ε r-approximation to R(μ, ) in time (n+m) · poly((nm)(-1)/ · 2 / (-1) / ε).