핵심 개념
Bridging the gap between Vanilla GANs and Wasserstein GANs through a theoretical lens.
초록
The article discusses the empirical success of Generative Adversarial Networks (GANs) and the interest in theoretical research, focusing on Wasserstein GANs. It highlights limitations of Vanilla GANs, introduces an oracle inequality for them in Wasserstein distance, and explores convergence rates for both types of GANs. The analysis extends to neural network discriminators, addressing challenges and improvements in approximation properties.
- Introduction to Generative Adversarial Networks (GANs) by Goodfellow et al.
- Comparison between Vanilla GANs and Wasserstein GANs.
- Oracle inequality for Vanilla GANs in Wasserstein distance.
- Convergence rates for Vanilla GANs and Wasserstein-type GANs with neural network discriminators.
통계
Statistical results for Vanilla GANs are limited.
Lipschitz function approximation by ReLU networks.
Rate of convergence n−α/2d∗ for Wasserstein-type GANs.
인용구
"Using our previous results, we derive an oracle inequality that depends on the network approximation errors."
"Our work aims to bridge the gap between Vanilla GANs and Wasserstein GANs."