Asymptotic theory for Bayesian inference and prediction: from the ordinary to a conditional Peaks-Over-Threshold method

The Peaks Over Threshold (POT) method is the most popular statistical method for the analysis of univariate extremes. Even though there is a rich applied literature on Bayesian inference for the POT method there is no asymptotic theory for such proposals. Even more importantly, the ambitious and challenging problem of predicting future extreme events according to a proper probabilistic forecasting approach has received no attention to date. In this paper we develop the asymptotic theory (consistency, contraction rates, asymptotic normality and asymptotic coverage of credible intervals) for the Bayesian inference based on the POT method. We extend such an asymptotic theory to cover the Bayesian inference on the tail properties of the conditional distribution of a response random variable conditionally to a vector of random covariates. With the aim to make accurate predictions of severer extreme events than those occurred in the past, we specify the posterior predictive distribution of a future unobservable excess variable in the unconditional and conditional approach and we prove that is Wasserstein consistent and derive its contraction rates. Simulations show the good performances of the proposed Bayesian inferential methods. The analysis of the change in the frequency of financial crises over time shows the utility of our methodology.