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arxiv: 2412.09302 · v1 · pith:P3IWW5HZ · submitted 2024-12-12 · math.FA · math.MG

On the structure of low-rank matrices that approximate the identity matrix

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classification math.FA math.MG
keywords elementsmatrixidentityleastnumberanswersapproximateapproximates
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Consider a matrix $A$ of rank $n$ that approximates the $N\times N$ identity matrix with elementwise error at most $1/3$. We give a lower bound on the number of elements s.t. $|A_{i,j}|>\gamma$, for a certain threshold. Two corollaries are obtained. 1. If $n \le K\log N$ with some $K$, then at least $c(K)N^2$ elements satisfy $|A_{i,j}|>c(K)n^{-1/2}$. This answers a question of B.S. Kashin. 2. The number of nonzero elements in $A$ is at least $c\log(N)/(n\log(2+n/\log N))$.

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