English

An Instance-Based Approach to the Trace Reconstruction Problem

Information Theory 2024-11-05 v3 Data Structures and Algorithms math.IT Probability Statistics Theory Statistics Theory

Abstract

In the trace reconstruction problem, one observes the output of passing a binary string s{0,1}ns \in \{0,1\}^n through a deletion channel TT times and wishes to recover ss from the resulting TT "traces." Most of the literature has focused on characterizing the hardness of this problem in terms of the number of traces TT needed for perfect reconstruction either in the worst case or in the average case (over input sequences ss). In this paper, we propose an alternative, instance-based approach to the problem. We define the "Levenshtein difficulty" of a problem instance (s,T)(s,T) as the probability that the resulting traces do not provide enough information for correct recovery with full certainty. One can then try to characterize, for a specific ss, how TT needs to scale in order for the Levenshtein difficulty to go to zero, and seek reconstruction algorithms that match this scaling for each ss. We derive a lower bound on the Levenshtein difficulty, and prove that TT needs to scale exponentially fast in nn for the Levenshtein difficulty to approach zero for a very broad class of strings. For a class of binary strings with alternating long runs, we design an algorithm whose probability of reconstruction error approaches zero whenever the Levenshtein difficulty approaches zero. For this class, we also prove that the error probability of this algorithm decays to zero at least as fast as the Levenshtein difficulty.

Keywords

Cite

@article{arxiv.2401.14277,
  title  = {An Instance-Based Approach to the Trace Reconstruction Problem},
  author = {Kayvon Mazooji and Ilan Shomorony},
  journal= {arXiv preprint arXiv:2401.14277},
  year   = {2024}
}

Comments

7 pages, part of this paper was presented at the 58th Annual Conference on Information Sciences and Systems (CISS 2024), funding information added in updated document, an error in the presentation of the main results in the CISS 2024 version of the paper is fixed in the updated document

R2 v1 2026-06-28T14:27:14.683Z