In this article we investigate high-dimensional banded sample covariance matrices under the regime that the sample size $n$, the dimension $p$ and the bandwidth $d$ tend simultaneously to infinity such that $$n/p\to 0 \ \ \text{and} \ \ 2d/n\to y>0.$$ It is shown that the empirical spectral distribution of those matrices almost surely converges weakly to some deterministic probability measure which is characterized by its moments. Certain restricted compositions of natural numbers play a crucial role in the evaluation of the expected moments of the empirical spectral distribution.
On the empirical spectral distribution for certain models related to sample covariance matrices with different correlations
Convergence Rate of Empirical Spectral Distribution of Random Matrices from Linear Codes
On the empirical spectral distribution for matrices with long memory and independent rows
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