Eugenio Melilli scite author profile

The paper develops and applies an expert-based stochastic population forecasting method, which can also be used to obtain a probabilistic version of scenario-based official forecasts. The full probability distribution of population forecasts is specified by starting from expert opinions on the future development of demographic components. Expert opinions are elicited as conditional on the realization of scenarios, in a two-step (or multiple-step) fashion. The method is applied to develop a stochastic forecast for the Italian population, starting from official scenarios from the Italian National Statistical Office.

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Some new results for Dirichlet priors

Cifarelli¹,

Melilli²

2000

Ann. Statist.

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Stochastic Population Forecasting Based on Combinations of Expert Evaluations Within the Bayesian Paradigm

Billari

Graziani

Melilli

2014

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This article suggests a procedure to derive stochastic population forecasts adopting an expert-based approach. As in previous work by Billari et al. (2012), experts are required to provide evaluations, in the form of conditional and unconditional scenarios, on summary indicators of the demographic components determining the population evolution: that is, fertility, mortality, and migration. Here, two main purposes are pursued. First, the demographic components are allowed to have some kind of dependence. Second, as a result of the existence of a body of shared information, possible correlations among experts are taken into account. In both cases, the dependence structure is not imposed by the researcher but rather is indirectly derived through the scenarios elicited from the experts. To address these issues, the method is based on a mixture model, within the so-called SupraBayesian approach, according to which expert evaluations are treated as data. The derived posterior distribution for the demographic indicators of interest is used as forecasting distribution, and a Markov chain Monte Carlo algorithm is designed to approximate this posterior. This article provides the questionnaire designed by the authors to collect expert opinions. Finally, an application to the forecast of the Italian population from 2010 to 2065 is proposed.

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Fiducial and Confidence Distributions for Real Exponential Families

Veronese

Melilli

2014

Scandinavian J Statistics

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We develop an easy and direct way to define and compute the fiducial distribution of a real parameter for both continuous and discrete exponential families. Furthermore, such a distribution satisfies the requirements to be considered a confidence distribution. Many examples are provided for models, which, although very simple, are widely used in applications. A characterization of the families for which the fiducial distribution coincides with a Bayesian posterior is given, and the strict connection with Jeffreys prior is shown. Asymptotic expansions of fiducial distributions are obtained without any further assumptions, and again, the relationship with the objective Bayesian analysis is pointed out. Finally, using the Edgeworth expansions, we compare the coverage of the fiducial intervals with that of other common intervals, proving the good behaviour of the former.

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A stochastic equation for the law of the random Dirichlet variance

Epifani

Guglielmi

Melilli

2006

Statistics & Probability Letters

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Eugenio Melilli

Stochastic Population Forecasts Based on Conditional Expert Opinions

Some new results for Dirichlet priors

Stochastic Population Forecasting Based on Combinations of Expert Evaluations Within the Bayesian Paradigm

Fiducial and Confidence Distributions for Real Exponential Families

A stochastic equation for the law of the random Dirichlet variance

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