Your search keyword '"Logistic mixture autoregressive model"' showing total 2 results

1. Testing for observation-dependent regime switching in mixture autoregressive models

Author

Pentti Saikkonen, Mika Meitz, Economics, Helsinki Centre of Economic Research (HECER), alayksikkö 2013-2021, Financial and Macroeconometrics, and Department of Mathematics and Statistics

Subjects

FOS: Computer and information sciences, Economics and Econometrics, Econometrics (econ.EM), Boundary (topology), Asymptotic distribution, Mathematics - Statistics Theory, Statistics Theory (math.ST), 01 natural sciences, Methodology (stat.ME), FOS: Economics and business, 010104 statistics & probability, Logistic mixture autoregressive model, 0502 economics and business, Null distribution, FOS: Mathematics, Statistical physics, 0101 mathematics, Higher-order approximation of the log-likelihood, Statistics - Methodology, 050205 econometrics, Mathematics, Economics - Econometrics, Singular information matrix, Markov chain, Applied Mathematics, 05 social sciences, Null (mathematics), Gaussian mixture autoregressive model, Likelihood ratio test, Mixture model, Autoregressive model, Likelihood-ratio test, 511 Economics

Abstract

Testing for regime switching when the regime switching probabilities are specified either as constants ('mixture models') or are governed by a finite-state Markov chain ('Markov switching models') are long-standing problems that have also attracted recent interest. This paper considers testing for regime switching when the regime switching probabilities are time-varying and depend on observed data ('observation-dependent regime switching'). Specifically, we consider the likelihood ratio test for observation-dependent regime switching in mixture autoregressive models. The testing problem is highly nonstandard, involving unidentified nuisance parameters under the null, parameters on the boundary, singular information matrices, and higher-order approximations of the log-likelihood. We derive the asymptotic null distribution of the likelihood ratio test statistic in a general mixture autoregressive setting using high-level conditions that allow for various forms of dependence of the regime switching probabilities on past observations, and we illustrate the theory using two particular mixture autoregressive models. The likelihood ratio test has a nonstandard asymptotic distribution that can easily be simulated, and Monte Carlo studies show the test to have good finite sample size and power properties. (C) 2020 The Authors. Published by Elsevier B.V.

Published

2021

2. Testing for observation-dependent regime switching in mixture autoregressive models

Author

Meitz, Mika and Saikkonen, Pentti

Subjects

higher-order approximation of the log-likelihood, Gaussian mixture autoregressive model, singular information matrix, likelihood ratio test, logistic mixture autoregressive model

Abstract

Testing for regime switching when the regime switching probabilities are specified either as constants (‘mixture models’) or are governed by a finite-state Markov chain (‘Markov switching models’) are long-standing problems that have also attracted recent interest. This paper considers testing for regime switching when the regime switching probabilities are time-varying and depend on observed data (‘observation-dependent regime switching’). Specifically, we consider the likelihood ratio test for observation-dependent regime switching in mixture autoregressive models. The testing problem is highly nonstandard, involving unidentified nuisance parameters under the null, parameters on the boundary, singular information matrices, and higher-order approximations of the log- likelihood. We derive the asymptotic null distribution of the likelihood ratio test statistic in a general mixture autoregressive setting using high-level conditions that allow for various forms of dependence of the regime switching probabilities on past observations, and we illustrate the theory using two particular mixture autoregressive models. The likelihood ratio test has a nonstandard asymptotic distribution that can easily be simulated, and Monte Carlo studies show the test to have satisfactory finite sample size and power properties.

Published

2017