Spread Divergence
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For distributions $\mathbb{P}$ and $\mathbb{Q}$ with different supports or undefined densities, the divergence $\textrm{D}(\mathbb{P}||\mathbb{Q})$ may not exist. We define a Spread Divergence $\tilde{\textrm{D}}(\mathbb{P}||\mathbb{Q})$ on modified $\mathbb{P}$ and $\mathbb{Q}$ and describe sufficient conditions for the existence of such a divergence. We demonstrate how to maximize the discriminatory power of a given divergence by parameterizing and learning the spread. We also give examples of using a Spread Divergence to train implicit generative models, including linear models (Independent Components Analysis) and non-linear models (Deep Generative Networks).
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Cited by 1 Pith paper
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Smoothed-KL Reweighting: A Principled Account and Matching Rule for SNR-Based Diffusion Training
Derives Soft-Min-SNR weight from spread divergence on local Gaussian surrogates, yielding closed-form w = sigma^2/(sigma^2+lambda) that matches Min-SNR at leading order.
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