Many flexible families of positive random variables exhibit non-closed forms of the density and distribution functions and this feature is considered unappealing for modelling purposes. However, such families are often characterized by a simple expression of the corresponding Laplace transform. Relying on the Laplace transform, we propose to carry out parameter estimation and goodnessof- fit testing for a general class of non-standard laws. We suggest a novel datadriven inferential technique, providing parameter estimators and goodness-of-fit tests, whose large-sample properties are derived. The implementation of the method is specifically considered for the positive stable and Tweedie distributions. A Monte Carlo study shows good finite-sample performance of the proposed technique for such laws.
Barabesi, L., Noia, A.D., Marcheselli, M., Pisani, C., Pratelli, L. (2026). Estimation and Goodness-of-Fit Testing for Non-Negative Random Variables with Explicit Laplace Transform. STATISTICA SINICA, 36, 1367-1388 [10.5705/ss.202023.0393].
Estimation and Goodness-of-Fit Testing for Non-Negative Random Variables with Explicit Laplace Transform
Barabesi, Lucio;Marcheselli, Marzia;Pisani, Caterina;
2026-01-01
Abstract
Many flexible families of positive random variables exhibit non-closed forms of the density and distribution functions and this feature is considered unappealing for modelling purposes. However, such families are often characterized by a simple expression of the corresponding Laplace transform. Relying on the Laplace transform, we propose to carry out parameter estimation and goodnessof- fit testing for a general class of non-standard laws. We suggest a novel datadriven inferential technique, providing parameter estimators and goodness-of-fit tests, whose large-sample properties are derived. The implementation of the method is specifically considered for the positive stable and Tweedie distributions. A Monte Carlo study shows good finite-sample performance of the proposed technique for such laws.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
https://hdl.handle.net/11365/1322554
Attenzione
Attenzione! I dati visualizzati non sono stati sottoposti a validazione da parte dell'ateneo
