General Spatio-Temporal Factor Models for High-Dimensional Random Fields on a Lattice

Abstract

Motivated by the need for analysing large spatio-temporal panel data, we introduce a novel dimensionality reduction methodology for n-dimensional random fields observed across a number S spatial locations and T time periods. We call it General Spatio-Temporal Factor Model (GSTFM). First, we provide the probabilistic and mathematical underpinning needed for the representation of a random field as the sum of two components: the common component (driven by a small number q of latent factors) and the idiosyncratic component (mildly cross-correlated). We show that the two components are identified as n∞. Second, we propose an estimator of the common component and derive its statistical guarantees (consistency and rate of convergence) as (n, S, T )∞. Third, we propose an information criterion to determine the number of factors. Estimation makes use of Fourier analysis in the frequency domain and thus we fully exploit the information on the spatio-temporal covariance structure of the whole panel. Synthetic data examples illustrate the applicability of GSTFM and its advantages over the extant generalized dynamic factor model that ignores the spatial correlations.

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