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Also variances of the matrix elmements are upto a order of constant. We study the linear eigenvalue statistics $\\mathcal{N}(\\phi)=\\sum_{i=1}^{n}\\phi(\\lambda_{i})$ of such matrices, where $\\lambda_{i}$ are the eigenvalues of $M_{n}$ and $\\phi$ is a sufficiently smooth function. 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Also variances of the matrix elmements are upto a order of constant. We study the linear eigenvalue statistics $\\mathcal{N}(\\phi)=\\sum_{i=1}^{n}\\phi(\\lambda_{i})$ of such matrices, where $\\lambda_{i}$ are the eigenvalues of $M_{n}$ and $\\phi$ is a sufficiently smooth function. 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