Almost Euclidean subspaces of ℓN1 via expander codes

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Almost Euclidean subspaces of ℓ^N₁ via expander codes

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Symposium on Discrete Algorithms archive
Proceedings of the nineteenth annual ACM-SIAM symposium on Discrete algorithms table of contents

San Francisco, California

Pages 353-362

Year of Publication: 2008

Authors

Venkatesan Guruswami	University of Washington, Seattle, WA and School of Mathematics, Princeton, NJ
James R. Lee	University of Washington, Seattle, WA
Alexander Razborov	School of Mathematics, Princeton, NJ and Steklov Mathematical Institute, Moscow, Russia

Sponsors

: SIAM Activity Group on Discrete Mathematics
SIGACT: ACM Special Interest Group on Algorithms and Computation Theory

Publisher

Society for Industrial and Applied Mathematics Philadelphia, PA, USA

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ABSTRACT

We give an explicit (in particular, deterministic polynomial time) construction of subspaces X ⊆ ℝ^N of dimension (1 - o(1))N such that for every x ∈ X, {display equation}.

If we are allowed to use N^{1/log log N} ≤ N°⁽¹⁾ random bits and dim(X) ≥ (1 - η)N for any fixed constant η, the lower bound can be further improved to (log N)^-°(1) √N||x||₂. Our construction makes use of unbalanced bipartite graphs to impose local linear constraints on vectors in the subspace, and our analysis relies on expansion properties of the graph. This is inspired by similar constructions of error-correcting codes.

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