Exact separation phenomenon for the eigenvalues of large Information-Plus-Noise type matrices. Application to spiked models

Abstract

We consider large Information-Plus-Noise type matrices of the form MN=(σ XNN+AN)(σ XNN+AN)* where XN is an n × N (n≤ N) matrix consisting of independent standardized complex entries, AN is an n × N nonrandom matrix and σ>0. As N tends to infinity, if n/N → c∈ ]0,1] and if the empirical spectral measure of AN AN* converges weakly to some compactly supported probability distribution ≠ δ0, Dozier and Silverstein established that almost surely the empirical spectral measure of MN converges weakly towards a nonrandom distribution μσ,,c. Bai and Silverstein proved, under certain assumptions on the model, that for some closed interval in ]0;+∞[ outside the support of μσ,,c satisfying some conditions involving AN, almost surely, no eigenvalues of MN will appear in this interval for all N large. In this paper, we carry on with the study of the support of the limiting spectral measure previously investigated by Dozier and Silverstein and later by Vallet, Loubaton and Mestre and Loubaton and P. Vallet, and we show that, under almost the same assumptions as Bai and Silvertein, there is an exact separation phenomenon between the spectrum of MN and the spectrum of ANAN*: to a gap in the spectrum of MN pointed out by Bai and Silverstein, it corresponds a gap in the spectrum of ANAN* which splits the spectrum of ANAN* exactly as that of MN. We use the previous results to characterize the outliers of spiked Information-Plus-Noise type models.