Noise sensitivity for the top eigenvector of a sparse random matrix
Abstract
We investigate the noise sensitivity of the top eigenvector of a sparse random symmetric matrix. Let v be the top eigenvector of an N× N sparse random symmetric matrix with an average of d non-zero centered entries per row. We resample k randomly chosen entries of the matrix and obtain another realization of the random matrix with top eigenvector v[k]. Building on recent results on sparse random matrices and a noise sensitivity analysis previously developed for Wigner matrices, we prove that, if d≥ N2/9, with high probability, when k N5/3, the vectors v and v[k] are almost collinear and, on the contrary, when k N5/3, the vectors v and v[k] are almost orthogonal. A similar result holds for the eigenvector associated to the second largest eigenvalue of the adjacency matrix of an Erdos-R\'enyi random graph with average degree d ≥ N2/9.
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