English

Outlaw distributions and locally decodable codes

Computational Complexity 2017-06-28 v2 Combinatorics Probability

Abstract

Locally decodable codes (LDCs) are error correcting codes that allow for decoding of a single message bit using a small number of queries to a corrupted encoding. Despite decades of study, the optimal trade-off between query complexity and codeword length is far from understood. In this work, we give a new characterization of LDCs using distributions over Boolean functions whose expectation is hard to approximate (in~LL_\infty~norm) with a small number of samples. We coin the term `outlaw distributions' for such distributions since they `defy' the Law of Large Numbers. We show that the existence of outlaw distributions over sufficiently `smooth' functions implies the existence of constant query LDCs and vice versa. We give several candidates for outlaw distributions over smooth functions coming from finite field incidence geometry, additive combinatorics and from hypergraph (non)expanders. We also prove a useful lemma showing that (smooth) LDCs which are only required to work on average over a random message and a random message index can be turned into true LDCs at the cost of only constant factors in the parameters.

Keywords

Cite

@article{arxiv.1609.06355,
  title  = {Outlaw distributions and locally decodable codes},
  author = {Jop Briët and Zeev Dvir and Sivakanth Gopi},
  journal= {arXiv preprint arXiv:1609.06355},
  year   = {2017}
}

Comments

A preliminary version of this paper appeared in the proceedings of ITCS 2017

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