Reed Solomon Codes Against Adversarial Insertions and Deletions

Abstract

In this work, we study the performance of Reed--Solomon codes against adversarial insertion-deletion (insdel) errors. We prove that over fields of size nO(k) there are [n,k] Reed-Solomon codes that can decode from n-2k+1 insdel errors and hence attain the half-Singleton bound. We also give a deterministic construction of such codes over much larger fields (of size nkO(k)). Nevertheless, for k=O( n / n) our construction runs in polynomial time. For the special case k=2, which received a lot of attention in the literature, we construct an [n,2] Reed-Solomon code over a field of size O(n4) that can decode from n-3 insdel errors. Earlier constructions required an exponential field size. Lastly, we prove that any such construction requires a field of size (n3).