Large data limits and scaling laws for tSNE

Abstract

This work considers large-data asymptotics for t-distributed stochastic neighbor embedding (tSNE), a widely-used non-linear dimension reduction algorithm. We identify an appropriate continuum limit of the tSNE objective function, which can be viewed as a combination of a kernel-based repulsion and an asymptotically-vanishing Laplacian-type regularizer. As a consequence, we show that embeddings of the original tSNE algorithm cannot have any consistent limit as n ∞. We propose a rescaled model which mitigates the asymptotic decay of the attractive energy, and which does have a consistent limit.

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