Resilience of the Rank of Random Matrices
Abstract
Let M be an n × m matrix of independent Rademacher ( 1) random variables. It is well known that if n ≤ m, then M is of full rank with high probability. We show that this property is resilient to adversarial changes to M. More precisely, if m ≥ n + n1-/6, then even after changing the sign of (1-)m/2 entries, M is still of full rank with high probability. Note that this is asymptotically best possible as one can easily make any two rows proportional with at most m/2 changes. Moreover, this theorem gives an asymptotic solution to a slightly weakened version of a conjecture made by Van Vu.
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