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Main Authors: Fynn, Daniel, Gunawan, David, Zammit-Mangion, Andrew
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.21075
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author Fynn, Daniel
Gunawan, David
Zammit-Mangion, Andrew
author_facet Fynn, Daniel
Gunawan, David
Zammit-Mangion, Andrew
contents Copula models are widely employed in multivariate time series analysis because they permit flexible modelling of marginal distributions independently of the dependence structure, which is fully characterised by the copula function. However, Bayesian inference with these models becomes computationally demanding as the number of variables in the time series increases. Motivated by the classical inference functions for margins (IFM) approach, we propose a new neural-network based inference framework for estimating parameters in copula models, termed the neural inference functions for margins (N-IFM). N-IFM enables rapid parameter estimation for new data, fast sequential prediction, and efficient model comparison via time-series validation. We assess the performance of N-IFM using both simulated and real datasets and compare it to Hamiltonian Monte Carlo, demonstrating substantial computational gains with comparable inferential accuracy.
format Preprint
id arxiv_https___arxiv_org_abs_2603_21075
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Neural Inference Functions for Margins for Time Series Copula Models
Fynn, Daniel
Gunawan, David
Zammit-Mangion, Andrew
Computation
Copula models are widely employed in multivariate time series analysis because they permit flexible modelling of marginal distributions independently of the dependence structure, which is fully characterised by the copula function. However, Bayesian inference with these models becomes computationally demanding as the number of variables in the time series increases. Motivated by the classical inference functions for margins (IFM) approach, we propose a new neural-network based inference framework for estimating parameters in copula models, termed the neural inference functions for margins (N-IFM). N-IFM enables rapid parameter estimation for new data, fast sequential prediction, and efficient model comparison via time-series validation. We assess the performance of N-IFM using both simulated and real datasets and compare it to Hamiltonian Monte Carlo, demonstrating substantial computational gains with comparable inferential accuracy.
title Neural Inference Functions for Margins for Time Series Copula Models
topic Computation
url https://arxiv.org/abs/2603.21075