Extracting a basis with fixed block inside a matrix
Abstract
Given U an n× m matrix of rank n and V block of columns inside U, we consider the problem of extracting a block of columns of rank n which minimize the Hilbert-Schmidt norm of the inverse while preserving the block V. This generalizes a previous result of Gluskin-Olevskii, and improves the estimates when given a "good" block V.
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