Related papers: Learning non-Gaussian graphical models via Hessian scores and triangular transport

Learning non-Gaussian graphical models via Hessian scores and triangular transport

URL: http://arxiv.org/abs/2101.03093v1
Date: Fri, 8 Jan 2021 16:42:42 GMT
Title: Learning non-Gaussian graphical models via Hessian scores and triangular transport
Authors: Ricardo Baptista, Youssef Marzouk, Rebecca E. Morrison, Olivier Zahm
Abstract summary: We propose an algorithm for learning the Markov structure of continuous and non-Gaussian distributions. Our algorithm SING estimates the density using a deterministic coupling, induced by a triangular transport map, and iteratively exploits sparse structure in the map to reveal sparsity in the graph.
Score: 6.308539010172309
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Undirected probabilistic graphical models represent the conditional dependencies, or Markov properties, of a collection of random variables. Knowing the sparsity of such a graphical model is valuable for modeling multivariate distributions and for efficiently performing inference. While the problem of learning graph structure from data has been studied extensively for certain parametric families of distributions, most existing methods fail to consistently recover the graph structure for non-Gaussian data. Here we propose an algorithm for learning the Markov structure of continuous and non-Gaussian distributions. To characterize conditional independence, we introduce a score based on integrated Hessian information from the joint log-density, and we prove that this score upper bounds the conditional mutual information for a general class of distributions. To compute the score, our algorithm SING estimates the density using a deterministic coupling, induced by a triangular transport map, and iteratively exploits sparse structure in the map to reveal sparsity in the graph. For certain non-Gaussian datasets, we show that our algorithm recovers the graph structure even with a biased approximation to the density. Among other examples, we apply sing to learn the dependencies between the states of a chaotic dynamical system with local interactions.

Related papers

Learning Cartesian Product Graphs with Laplacian Constraints [10.15283812819547]
We study the problem of learning Cartesian product graphs under Laplacian constraints. We establish statistical consistency for the penalized maximum likelihood estimation. We also extend our method for efficient joint graph learning and imputation in the presence of structural missing values.
arXiv Detail & Related papers (2024-02-12T22:48:30Z)
Learning graphs and simplicial complexes from data [26.926502862698168]
We present a novel method to infer the underlying graph topology from available data. We also identify three-node interactions, referred to in the literature as second-order simplicial complexes (SCs) Experimental results on synthetic and real-world data showcase a superior performance for our approach compared to existing methods.
arXiv Detail & Related papers (2023-12-16T22:02:20Z)
Improving embedding of graphs with missing data by soft manifolds [51.425411400683565]
The reliability of graph embeddings depends on how much the geometry of the continuous space matches the graph structure. We introduce a new class of manifold, named soft manifold, that can solve this situation. Using soft manifold for graph embedding, we can provide continuous spaces to pursue any task in data analysis over complex datasets.
arXiv Detail & Related papers (2023-11-29T12:48:33Z)
Bures-Wasserstein Means of Graphs [60.42414991820453]
We propose a novel framework for defining a graph mean via embeddings in the space of smooth graph signal distributions. By finding a mean in this embedding space, we can recover a mean graph that preserves structural information. We establish the existence and uniqueness of the novel graph mean, and provide an iterative algorithm for computing it.
arXiv Detail & Related papers (2023-05-31T11:04:53Z)
GrannGAN: Graph annotation generative adversarial networks [72.66289932625742]
We consider the problem of modelling high-dimensional distributions and generating new examples of data with complex relational feature structure coherent with a graph skeleton. The model we propose tackles the problem of generating the data features constrained by the specific graph structure of each data point by splitting the task into two phases. In the first it models the distribution of features associated with the nodes of the given graph, in the second it complements the edge features conditionally on the node features.
arXiv Detail & Related papers (2022-12-01T11:49:07Z)
Latent Graph Inference using Product Manifolds [0.0]
We generalize the discrete Differentiable Graph Module (dDGM) for latent graph learning. Our novel approach is tested on a wide range of datasets, and outperforms the original dDGM model.
arXiv Detail & Related papers (2022-11-26T22:13:06Z)
Score-based Generative Modeling of Graphs via the System of Stochastic Differential Equations [57.15855198512551]
We propose a novel score-based generative model for graphs with a continuous-time framework. We show that our method is able to generate molecules that lie close to the training distribution yet do not violate the chemical valency rule.
arXiv Detail & Related papers (2022-02-05T08:21:04Z)
Regularization of Mixture Models for Robust Principal Graph Learning [0.0]
A regularized version of Mixture Models is proposed to learn a principal graph from a distribution of $D$-dimensional data points. Parameters of the model are iteratively estimated through an Expectation-Maximization procedure.
arXiv Detail & Related papers (2021-06-16T18:00:02Z)
A Robust and Generalized Framework for Adversarial Graph Embedding [73.37228022428663]
We propose a robust framework for adversarial graph embedding, named AGE. AGE generates the fake neighbor nodes as the enhanced negative samples from the implicit distribution. Based on this framework, we propose three models to handle three types of graph data.
arXiv Detail & Related papers (2021-05-22T07:05:48Z)
Block-Approximated Exponential Random Graphs [77.4792558024487]
An important challenge in the field of exponential random graphs (ERGs) is the fitting of non-trivial ERGs on large graphs. We propose an approximative framework to such non-trivial ERGs that result in dyadic independence (i.e., edge independent) distributions. Our methods are scalable to sparse graphs consisting of millions of nodes.
arXiv Detail & Related papers (2020-02-14T11:42:16Z)

This list is automatically generated from the titles and abstracts of the papers in this site.