Abstract
In this paper, a linear Bayes method is employed to simultaneously estimate the location parameter and the scale parameter of the extreme value distribution. Based on type II censored samples, we construct the linear Bayes estimator (LBE) of the parameter vector and establish its superiority over the classical unbiased estimator in terms of the mean square error matrix criterion. The proposed LBE is easy to calculate, and numerical results are presented to verify that the LBE works well. The estimator is further applied to a real data case to demonstrate its feasibility.