On the detection of low rank matrices in the high-dimensional regime

Abstract

We address the detection of a low rank n× ndeterministic matrix X0 from the noisy observation X0+ Z when n∞, where Z is a complex Gaussian random matrix with independent identically distributed Nc(0,1n) entries. Thanks to large random matrix theory results, it is now well-known that if the largest singular value λ1 of X0 verifies λ1>1, then it is possible to exhibit consistent tests. In this contribution, we prove a contrario that under the condition λ1<1, there are no consistent tests. Our proof is rather simple, inspired by previous works devoted to the case of rank 1 matrices X0.