Related papers: Scalable Deep Gaussian Markov Random Fields for General Graphs

Scalable Deep Gaussian Markov Random Fields for General Graphs

URL: http://arxiv.org/abs/2206.05032v1
Date: Fri, 10 Jun 2022 12:12:41 GMT
Title: Scalable Deep Gaussian Markov Random Fields for General Graphs
Authors: Joel Oskarsson, Per Sid\'en, Fredrik Lindsten
Abstract summary: We propose a flexible GMRF model for general graphs built on the multi-layer structure of Deep GMRFs. For a Gaussian likelihood, close to exact Bayesian inference is available for the latent field. The usefulness of the proposed model is verified by experiments on a number of synthetic and real world datasets.
Score: 14.653008985229615
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Machine learning methods on graphs have proven useful in many applications due to their ability to handle generally structured data. The framework of Gaussian Markov Random Fields (GMRFs) provides a principled way to define Gaussian models on graphs by utilizing their sparsity structure. We propose a flexible GMRF model for general graphs built on the multi-layer structure of Deep GMRFs, originally proposed for lattice graphs only. By designing a new type of layer we enable the model to scale to large graphs. The layer is constructed to allow for efficient training using variational inference and existing software frameworks for Graph Neural Networks. For a Gaussian likelihood, close to exact Bayesian inference is available for the latent field. This allows for making predictions with accompanying uncertainty estimates. The usefulness of the proposed model is verified by experiments on a number of synthetic and real world datasets, where it compares favorably to other both Bayesian and deep learning methods.

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