Marchenko-Pastur law with relaxed independence conditions

Abstract

We prove the Marchenko-Pastur law for the eigenvalues of p × p sample covariance matrices in two new situations where the data does not have independent coordinates. In the first scenario - the block-independent model - the p coordinates of the data are partitioned into blocks in such a way that the entries in different blocks are independent, but the entries from the same block may be dependent. In the second scenario - the random tensor model - the data is the homogeneous random tensor of order d, i.e. the coordinates of the data are all nd different products of d variables chosen from a set of n independent random variables. We show that Marchenko-Pastur law holds for the block-independent model as long as the size of the largest block is o(p) and for the random tensor model as long as d = o(n1/3). Our main technical tools are new concentration inequalities for quadratic forms in random variables with block-independent coordinates, and for random tensors.