Codes Correcting Two Bursts of Exactly b Deletions

Abstract

In this paper, we investigate codes designed to correct two bursts of deletions, where each burst has a length of exactly b, where b>1. The previous best construction, achieved through the syndrome compression technique, had a redundancy of at most 7 n+O( n/ n) bits. In contrast, our work introduces a novel approach for constructing q-ary codes that attain a redundancy of at most 5 n+O( n) bits for all b>1 and q2. Additionally, for the case where b=1, we present a new construction of q-ary two-deletion correcting codes with a redundancy of 5 n+O( n) bits, for all q>2.