Sequence Reconstruction Problem for Deletion Channels: A Complete Asymptotic Solution

Abstract

Transmit a codeword x, that belongs to an (-1)-deletion-correcting code of length n, over a t-deletion channel for some 1 t<n. Levenshtein, in 2001, proposed the problem of determining N(n,,t)+1, the minimum number of distinct channel outputs required to uniquely reconstruct x. Prior to this work, N(n,,t) is known only when ∈\1,2\. Here, we provide an asymptotically exact solution for all values of and t. Specifically, we show that N(n,,t)=2/(t-)! nt- - O(nt--1) and in the special instance where =t, we show that N(n,,)=2. We also provide a conjecture on the exact value of N(n,,t) for all values of n, , and t.