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arxiv: 2106.05367 · v2 · pith:VBJCG5CV · submitted 2021-06-09 · cs.LG · stat.ML

Pulling back information geometry

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classification cs.LG stat.ML
keywords latentdecoderspacebackdistributionsgeometriesgeometrymetric
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Latent space geometry has shown itself to provide a rich and rigorous framework for interacting with the latent variables of deep generative models. The existing theory, however, relies on the decoder being a Gaussian distribution as its simple reparametrization allows us to interpret the generating process as a random projection of a deterministic manifold. Consequently, this approach breaks down when applied to decoders that are not as easily reparametrized. We here propose to use the Fisher-Rao metric associated with the space of decoder distributions as a reference metric, which we pull back to the latent space. We show that we can achieve meaningful latent geometries for a wide range of decoder distributions for which the previous theory was not applicable, opening the door to `black box' latent geometries.

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