Some stochastic inequalities for weighted sums

Abstract

We compare weighted sums of i.i.d. positive random variables according to the usual stochastic order. The main inequalities are derived using majorization techniques under certain log-concavity assumptions. Specifically, let Yi be i.i.d. random variables on R+. Assuming that Yi has a log-concave density, we show that Σ aiYi is stochastically smaller than Σ biYi, if ( a1,..., an) is majorized by ( b1,..., bn). On the other hand, assuming that Yip has a log-concave density for some p>1, we show that Σ aiYi is stochastically larger than Σ biYi, if (a1q,...,anq) is majorized by (b1q,...,bnq), where p-1+q-1=1. These unify several stochastic ordering results for specific distributions. In particular, a conjecture of Hitczenko [Sankhy\=a A 60 (1998) 171--175] on Weibull variables is proved. Potential applications in reliability and wireless communications are mentioned.