Taylor & Francis Group
Browse
- No file added yet -

Latent Gaussian Count Time Series

Download (472.92 kB)
dataset
posted on 2021-06-21, 19:20 authored by Yisu Jia, Stefanos Kechagias, James Livsey, Robert Lund, Vladas Pipiras

This article develops the theory and methods for modeling a stationary count time series via Gaussian transformations. The techniques use a latent Gaussian process and a distributional transformation to construct stationary series with very flexible correlation features that can have any prespecified marginal distribution, including the classical Poisson, generalized Poisson, negative binomial, and binomial structures. Gaussian pseudo-likelihood and implied Yule–Walker estimation paradigms, based on the autocovariance function of the count series, are developed via a new Hermite expansion. Particle filtering and sequential Monte Carlo methods are used to conduct likelihood estimation. Connections to state space models are made. Our estimation approaches are evaluated in a simulation study and the methods are used to analyze a count series of weekly retail sales. Supplementary materials for this article are available online.

Funding

Robert Lund’s research was partially supported by the grant NSF DMS 1407480. Vladas Pipiras’s research was partially supported by the grant NSF DMS 1712966.

History