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Stationarity and ergodicity of vector STAR models
Preprint
29 May 2018
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Abstract
Smooth transition autoregressive models are widely used to capture nonlinearities in univariate and multivariate time series. Existence of stationary solution is typically assumed, implicitly or explicitly. In this paper we describe conditions for stationarity and ergodicity of vector STAR models. The key condition is that the joint spectral radius of certain matrices is below 1, which is not guaranteed if only separate spectral radii are below 1. Our result allows to use recently introduced toolboxes from computational mathematics to verify the stationarity and ergodicity of vector STAR models.
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Most cited references8
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Computationally Efficient Approximations of the Joint Spectral Radius
Vincent D Blondel, Yurii Nesterov (2005)
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Computing the joint spectral radius
Gustaf Gripenberg (1996)
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Vector equilibrium correction models with non-linear discontinuous adjustments
Frederique Bec, Anders Rahbek (2004)