Abstract
For symmetric random matrices with correlated entries, which are functions of independent random variables, we show that the asymptotic behavior of the empirical eigenvalue distribution can be obtained by analyzing a Gaussian matrix with the same covariance structure. This class contains both cases of short and long range dependent random fields. The technique is based on a blend of blocking procedure and Lindeberg's method. This method leads to a variety of interesting asymptotic results for matrices with dependent entries, including applications to linear processes as well as nonlinear Volterra-type processes entries.
| Original language | English (US) |
|---|---|
| Pages (from-to) | 2700-2726 |
| Number of pages | 27 |
| Journal | Stochastic Processes and their Applications |
| Volume | 125 |
| Issue number | 7 |
| DOIs | |
| State | Published - Jul 1 2015 |
Keywords
- Correlated entries
- Limiting spectral distribution
- Random matrices
- Sample covariance matrices
- Weak dependence
ASJC Scopus subject areas
- Statistics and Probability
- Modeling and Simulation
- Applied Mathematics