Sparsity of Quadratically Regularized Optimal Transport: Scalar Case
Abstract
The quadratically regularized optimal transport problem is empirically known to have sparse solutions: its optimal coupling π has sparse support for small regularization parameter , in contrast to entropic regularization whose solutions have full support for any >0. Focusing on continuous and scalar marginals, we provide the first precise description of this sparsity. Namely, we show that the support of π shrinks to the Monge graph at the sharp rate 1/3. This result is based on a detailed analysis of the dual potential f for small . In particular, we prove that f is twice differentiable a.s. and bound the second derivative uniformly in , showing that f is uniformly strongly convex. Convergence rates for f and its derivative are also obtained.
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