Almost Sure Convergence of Extreme Order Statistics

Abstract

Let Mn(k) denote the kth largest maximum of a sample (X1,X2,...,Xn) from parent X with continuous distribution. Assume there exist normalizing constants an>0, bn∈ R and a nondegenerate distribution G such that an-1(Mn(1)-bn)wG. Then for fixed k∈ N, the almost sure convergence of \[1DNΣn=kNdnI\Mn(1) anx1+bn,Mn(2) anx2+bn,...,Mn(k) anxk+bn\\] is derived if the positive weight sequence (dn) with DN=Σn=1Ndn satisfies conditions provided by H\"ormann.