Some New Results on Sequence Reconstruction Problem for Deletion Channels

Abstract

Levenshtein first introduced the sequence reconstruction problem in 2001. In the realm of combinatorics, the sequence reconstruction problem is equivalent to determining the value of N(n,d,t), which represents the maximum size of the intersection of two metric balls of radius t, given that the distance between their centers is at least d and the sequence length is n. In this paper, We present a lower bound on N(n,3,t) for n≥ \13,t+8\ and t ≥ 4. For t=4, we prove that this lower bound is tight. This settles an open question posed by Pham, Goyal, and Kiah, confirming that N(n,3,4)=20n-166 for all n ≥ 13.