Central limit theorem for signal-to-interference ratio of reduced rank linear receiver

Abstract

Let sk=1N(v1k,...,vNk)T, with \vik,i,k=1,...\ independent and identically distributed complex random variables. Write Sk=(s1,..., sk-1,sk+1,... ,sK), Pk= diag(p1,...,pk-1,pk+1,...,pK), Rk=(SkPkSk*+σ 2I) and Akm=[sk,Rksk,... ,Rkm-1sk]. Define βkm=pksk*Akm( Akm*×\ mathbfRkAkm)-1Akm*sk, referred to as the signal-to-interference ratio (SIR) of user k under the multistage Wiener (MSW) receiver in a wireless communication system. It is proved that the output SIR under the MSW and the mutual information statistic under the matched filter (MF) are both asymptotic Gaussian when N/K c>0. Moreover, we provide a central limit theorem for linear spectral statistics of eigenvalues and eigenvectors of sample covariance matrices, which is a supplement of Theorem 2 in Bai, Miao and Pan [Ann. Probab. 35 (2007) 1532--1572]. And we also improve Theorem 1.1 in Bai and Silverstein [Ann. Probab. 32 (2004) 553--605].