On modelling positive continuous data with spatio-temporal dependence
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In this paper we aim to propose two models for regression and dependence analysis when dealing with positive spatial or spatio-temporal continuous data. Specifically we propose two (possibly non stationary) random processes with Gamma and Weibull marginals. Both processes stem from the same idea, namely from the transformation of a sum of independent copies of a squared Gaussian random process. We provide analytic expression for the bivariate distributions and we study the associated geometrical and extremal properties. Since maximum likelihood estimation method is not feasible, even for relatively small data-set, we suggest to adopt the pairwise likelihood. The effectiveness of our proposal is illustrated through a simulation study that we supplement with a new analysis of well-known dataset, the Irish wind speed data Haslett:Raftery:1989. In our example we do not consider a preliminary transformation of the data differently from the previous studies.
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