Realizing GANs via a Tunable Loss Function
Abstract
We introduce a tunable GAN, called α-GAN, parameterized by α ∈ (0,∞], which interpolates between various f-GANs and Integral Probability Metric based GANs (under constrained discriminator set). We construct α-GAN using a supervised loss function, namely, α-loss, which is a tunable loss function capturing several canonical losses. We show that α-GAN is intimately related to the Arimoto divergence, which was first proposed by \"Osterriecher (1996), and later studied by Liese and Vajda (2006). We also study the convergence properties of α-GAN. We posit that the holistic understanding that α-GAN introduces will have practical benefits of addressing both the issues of vanishing gradients and mode collapse.
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