Non-binary Two-Deletion Correcting Codes and Burst-Deletion Correcting Codes

Abstract

In this paper, we construct systematic q-ary two-deletion correcting codes and burst-deletion correcting codes, where q≥ 2 is an even integer. For two-deletion codes, our construction has redundancy 5 n+O( q n) and has encoding complexity near-linear in n, where n is the length of the message sequences. For burst-deletion codes, we first present a construction of binary codes with redundancy n+9 n+γt+o( n) bits (γt is a constant that depends only on t) and capable of correcting a burst of at most t deletions, which improves the Lenz-Polyanskii Construction (ISIT 2020). Then we give a construction of q-ary codes with redundancy n+(8 q+9) n+o( q n)+γt bits and capable of correcting a burst of at most t deletions.