A Copula-Based Approach to Modelling and Testing for Heavy-tailed Data with Bivariate Heteroscedastic Extremes

Heteroscedasticity and correlated data pose challenges for extreme value analysis, particularly in two-sample testing problems for tail behaviors. In this paper, we propose a novel copula-based multivariate model for independent but not identically distributed heavy-tailed data with heterogeneous marginal distributions and a varying copula structure. The proposed model encompasses classical models with independent and identically distributed data and some models with a mixture of correlation. To understand the tail behavior, we introduce the quasi-tail copula, which integrates both marginal heteroscedasticity and the dependence structure of the varying copula, and further propose the estimation approach. We then establish the joint asymptotic properties for the Hill estimator, scedasis functions, and quasi-tail copula. In addition, a multiplier bootstrap method is applied to estimate their complex covariance. Moreover, it is of practical interest to develop four typical two-sample testing problems under the new model, which include the equivalence of the extreme value indices and scedasis functions. Finally, we conduct simulation studies to validate our tests and apply the new model to the data from the stock market.