Improved upper bounds for the rigidity of Kronecker products

Abstract: The rigidity of a matrix A for target rank r is the minimum number of entries of A that need to be changed in order to obtain a matrix of rank at most r. Matrix rigidity was introduced by Valiant in 1977 as a tool to prove circuit lower bounds for linear functions and since then this notion has also found applications in other areas of complexity theory.Recently (arXiv 2021), Alman proved that for any field F, d ≥ 2 and arbitrary matricesIn this note we improve this result in two directions. First, we do not r… Show more