English

Deep Holes in Reed-Solomon Codes Based on Dickson Polynomials

Number Theory 2016-04-19 v4

Abstract

For an [n,k][n,k] Reed-Solomon code C\mathcal{C}, it can be shown that any received word rr lies a distance at most nkn-k from C\mathcal{C}, denoted d(r,C)nkd(r,\mathcal{C})\leq n-k. Any word rr meeting the equality is called a deep hole. Guruswami and Vardy (2005) showed that for a specific class of codes, determining whether or not a word is a deep hole is NP-hard. They suggested passingly that it may be easier when the evaluation set of C\mathcal{C} is large or structured. Following this idea, we study the case where the evaluation set is the image of a Dickson polynomial, whose values appear with a special uniformity. To find families of received words that are not deep holes, we reduce to a subset sum problem (or equivalently, a Dickson polynomial-variation of Waring's problem) and find solution conditions by applying an argument using estimates on character sums indexed over the evaluation set.

Cite

@article{arxiv.1507.01653,
  title  = {Deep Holes in Reed-Solomon Codes Based on Dickson Polynomials},
  author = {Matt Keti and Daqing Wan},
  journal= {arXiv preprint arXiv:1507.01653},
  year   = {2016}
}
R2 v1 2026-06-22T10:06:55.955Z