| Abstract [eng] |
In this work I analyzed geometric max stability of univariate and bivariate Pareto random variables. I have proved, that univariate Pareto distribution is geometrically max stable when alpha=1. But it is not geometrically max stable when alpha unequal 1. Using the criterion of geometric max stability for bivariate Pareto random variables, I have proved, that bivariate Pareto distribution function is not geometrically max stable, when vectors’ components are independent (when alpha=1, beta=1 and alpha unequal 1, beta unequal 1). Also bivariate Pareto distribution function is not geometrically max stable, when vectors’ components are dependent (when alpha=1, beta=1 and alpha unequal 1, beta unequal 1). Research of bivariate Pareto distributions submitted unexpected results. Bivariate Pareto distribution function is not geometrically max stable, when alpha=1, beta=1. But marginal Pareto distribution functions are geometrically max stable, when alpha=1, beta=1. |
