Your search keyword '"Gorgi, Paolo"' showing total 2 results

1. Beta–negative binomial auto‐regressions for modelling integer‐valued time series with extreme observations.

Author

Gorgi, Paolo

Subjects

TIME series analysis, NEGATIVE binomial distribution, BINOMIAL distribution, ASYMPTOTIC normality, DRUG traffic, CONDITIONAL expectations, LINEAR equations

Abstract

Summary: The paper introduces a general class of heavy‐tailed auto‐regressions for modelling integer‐valued time series with outliers. The specification proposed is based on a heavy‐tailed mixture of negative binomial distributions that features an observation‐driven dynamic equation for the conditional expectation. The existence of a stationary and ergodic solution for the class of auto‐regressive processes is shown under general conditions. The estimation of the model can be easily performed by maximum likelihood given the closed form of the likelihood function. The strong consistency and the asymptotic normality of the estimator are formally derived. Two examples of specifications illustrate the flexibility of the approach and the relevance of the theoretical results. In particular, a linear dynamic equation and a score‐driven equation for the conditional expectation are studied. The score‐driven specification is shown to be particularly appealing as it delivers a robust filtering method that attenuates the effect of outliers. Empirical applications to the series of narcotics trafficking reports in Sydney and the euro–pound sterling exchange rate illustrate the effectiveness of the method in handling extreme observations. [ABSTRACT FROM AUTHOR]

Published

2020

2. Integer‐Valued Autoregressive Models With Survival Probability Driven By A Stochastic Recurrence Equation.

Author

Gorgi, Paolo

Subjects

*AUTOREGRESSIVE models, *PROBABILITY theory, *RECURSIVE sequences (Mathematics), *TIME series analysis, *INFERENTIAL statistics

Abstract

This paper proposes a new class of integer‐valued autoregressive models with a dynamic survival probability. The peculiarity of this class of models lies in the specification of the survival probability through a stochastic recurrence equation. The proposed models can effectively capture changing dependence over time and enhance both the in‐sample and out‐of‐sample performance of integer‐valued autoregressive models. This point is illustrated through an empirical application to a real‐time series of crime reports. Additionally, this paper discusses the reliability of likelihood‐based inference for the class of models. In particular, this study proves the consistency of the maximum likelihood estimator and a plug‐in estimator for the conditional probability mass function in a misspecified model setting. [ABSTRACT FROM AUTHOR]

Published

2018