## Frontmatter | | | | --- | --- | | Authors | [[Patrick Dallaire]], [[Luca Ambrogioni]], [[Ludovic Trottier]], [[Umut Güçlü]], [[Max Hinne]], [[Philippe Giguère]], [[Marcel van Gerven]], [[François Laviolette]] | | Date | 2020/08 | | Source | [[Conference on Uncertainty in Artificial Intelligence]] | | URL | https://proceedings.mlr.press/v124/dallaire20a | | Citation | Dallaire, P., Ambrogioni, L., Trottier, L., Güçlü, U., Hinne, M., Giguère, P., van Gerven, M., & Laviolette, F. (2020). [[The Indian chefs process]]. In _Conference on Uncertainty in Artificial Intelligence_. [[URL](https://proceedings.mlr.press/v124/dallaire20a)]. #Conference | ## Abstract This paper introduces the Indian chefs process (ICP) as a Bayesian nonparametric prior on the joint space of infinite directed acyclic graphs (DAGs) and orders that generalizes the Indian buffet process. As our construction shows, the proposed distribution relies on a latent Beta process controlling both the orders and outgoing connection probabilities of the nodes, and yields a probability distribution on sparse infinite graphs. The main advantage of the ICP over previously proposed Bayesian nonparametric priors for DAG structures is its greater flexibility. To the best of our knowledge, the ICP is the first Bayesian nonparametric model supporting every possible DAG involving latent nodes. We demonstrate the usefulness of the ICP on learning the structure of deep generative sigmoid networks as well as convolutional neural networks. ## PDF ![[The Indian chefs process.pdf]]