Preserving Extreme Singular Values with One Oblivious Sketch
Abstract
We study when a single linear sketch can control the largest and smallest nonzero singular values of every rank-r matrix. Classical oblivious embeddings require s=(r/2) for (1) distortion, but this does not yield constant-factor control of extreme singular values or condition numbers. We formalize a conjecture that s=O(r r) suffices for such preservation. On the constructive side, we show that combining a sparse oblivious sketch with a deterministic geometric balancing map produces a sketch whose nonzero singular values collapse to a common scale under bounded condition number and coherence. On the negative side, we prove that any oblivious sketch achieving relative -accurate singular values for all rank-r matrices must satisfy s=((r+(1/δ))/2). Numerical experiments on structured matrix families confirm that balancing improves conditioning and accelerates iterative solvers, while coherent or nearly rank-deficient inputs manifest the predicted failure modes.
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