DS1 spectrogram: Adjusted Wasserstein distances for bridging empirical and true distributions with applications to MDS

Adjusted Wasserstein distances for bridging empirical and true distributions with applications to MDS

2606.29665

Authors

Johan Van Horebeek,Flor Martinez-Sermeno,Arturo Jaramillo

Abstract

This paper examines how metric adjustments to Multidimensional Scaling (MDS) can enhance its effectiveness as a visual tool for pattern recognition. The distance under consideration, referred to as Max-D-SW, is an adjustment of the Max-Sliced Wasserstein distance.

In contrast to the original formulation, which optimizes over single unit directions, Max-D-SW aggregates contributions over orthonormal bases. This modification provides a clear numerical advantage in MDS outcomes, particularly when applied to heavy-tailed distributions.

We also establish sample-complexity bounds showing that Max-D-SW remains statistically tractable, with rates comparable to those of its max-sliced counterpart. Moreover, we show that a better sample complexity for a metric does not necessarily translate into better performance when the metric is used as an input for MDS.

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