Adaptive and minimax optimal estimation of the tail coefficient

Abstract

We consider the problem of estimating the tail index α of a distribution satisfying a (α, β) second-order Pareto-type condition, where β is the second-order coefficient. When β is available, it was previously proved that α can be estimated with the oracle rate n-β/(2β+1). On the contrary, when β is not available, estimating α with the oracle rate is challenging; so additional assumptions that imply the estimability of β are usually made. In this paper, we propose an adaptive estimator of α, and show that this estimator attains the rate (n/ n)-β/(2β+1) without a priori knowledge of β and any additional assumptions. Moreover, we prove that this ( n)β/(2β+1) factor is unavoidable by obtaining the companion lower bound.