Probabilistic Graphical Models (PGMs) encode conditional dependencies among random variables using a graph–nodes for variables, links for dependencies–and factorize the joint distribution into lower-dimensional components. This makes PGMs well-suited for analyzing complex systems and supporting decision-making. Recent advances in topological signal processing highlight the importance of variables defined on topological spaces in several application domains. In such cases, the underlying topology shapes statistical relationships, limiting the expressiveness of canonical PGMs. To overcome this limitation, we introduce Colored Markov Random Fields (CMRFs), which model both conditional and marginal dependencies among Gaussian edge variables on topological spaces, with a theoretical foundation in Hodge theory. CMRFs extend classical Gaussian Markov Random Fields by including link coloring: connectivity encodes conditional independence, while color encodes marginal independence. We quantify the benefits of CMRFs through a distributed estimation case study over a physical network, comparing it with baselines with different levels of topological prior.

Colored Markov random fields for probabilistic topological modeling / Marinucci, L., Di Nino, L., D’Acunto, G., Pandolfo, M.E., Di Lorenzo, P., Barbarossa, S.. - (2025), pp. 161-165. (2025 59th Asilomar Conference on Signals, Systems, and Computers Pacific Grove; CA; USA ) [10.1109/IEEECONF67917.2025.11443772].

Colored Markov random fields for probabilistic topological modeling

Lorenzo Marinucci;Leonardo Di Nino;Gabriele D’Acunto;Mario Edoardo Pandolfo;Paolo Di Lorenzo;Sergio Barbarossa
2025

Abstract

Probabilistic Graphical Models (PGMs) encode conditional dependencies among random variables using a graph–nodes for variables, links for dependencies–and factorize the joint distribution into lower-dimensional components. This makes PGMs well-suited for analyzing complex systems and supporting decision-making. Recent advances in topological signal processing highlight the importance of variables defined on topological spaces in several application domains. In such cases, the underlying topology shapes statistical relationships, limiting the expressiveness of canonical PGMs. To overcome this limitation, we introduce Colored Markov Random Fields (CMRFs), which model both conditional and marginal dependencies among Gaussian edge variables on topological spaces, with a theoretical foundation in Hodge theory. CMRFs extend classical Gaussian Markov Random Fields by including link coloring: connectivity encodes conditional independence, while color encodes marginal independence. We quantify the benefits of CMRFs through a distributed estimation case study over a physical network, comparing it with baselines with different levels of topological prior.
2025
2025 59th Asilomar Conference on Signals, Systems, and Computers
graphical models; shape; noise; estimation; probabilistic logic; topology; sensors; random variables; Markov random fields; synthetic data
04 Pubblicazione in atti di convegno::04b Atto di convegno in volume
Colored Markov random fields for probabilistic topological modeling / Marinucci, L., Di Nino, L., D’Acunto, G., Pandolfo, M.E., Di Lorenzo, P., Barbarossa, S.. - (2025), pp. 161-165. (2025 59th Asilomar Conference on Signals, Systems, and Computers Pacific Grove; CA; USA ) [10.1109/IEEECONF67917.2025.11443772].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/1771102
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