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A Combinatorial Perspective on Random Access Efficiency for DNA Storage

Information Theory 2025-09-25 v3 Combinatorics math.IT

Abstract

We investigate the fundamental limits of the recently proposed random access coverage depth problem for DNA data storage. Under this paradigm, it is assumed that the user information consists of kk information strands, which are encoded into nn strands via a generator matrix GG. During the sequencing process, the strands are read uniformly at random, as each strand is available in a large number of copies. In this context, the random access coverage depth problem refers to the expected number of reads (i.e., sequenced strands) required to decode a specific information strand requested by the user. This problem heavily depends on the generator matrix GG, and besides computing the expectation for different choices of GG, the goal is to construct matrices that minimize the maximum expectation over all possible requested information strands, denoted by Tmax(G)T_{\max}(G). In this paper, we introduce new techniques to investigate the random access coverage depth problem, capturing its combinatorial nature and identifying the structural properties of generator matrices that are advantageous. We establish two general formulas to determine Tmax(G)T_{\max}(G) for arbitrary generator matrices. The first formula depends on the linear dependencies between columns of GG, whereas the second formula takes into account recovery sets and their intersection structure. We also introduce the concept of recovery balanced codes and provide three sufficient conditions for a code to be recovery balanced. These conditions can be used to compute Tmax(G)T_{\max}(G) for various families of codes, such as MDS, simplex, Hamming, and binary Reed-Muller codes. Additionally, we study the performance of modified systematic MDS and simplex matrices, showing that the best results for Tmax(G)T_{\max}(G) are achieved with a specific combination of encoded strands and replication of the information strands.

Keywords

Cite

@article{arxiv.2401.15722,
  title  = {A Combinatorial Perspective on Random Access Efficiency for DNA Storage},
  author = {Anina Gruica and Daniella Bar-Lev and Alberto Ravagnani and Eitan Yaakobi},
  journal= {arXiv preprint arXiv:2401.15722},
  year   = {2025}
}
R2 v1 2026-06-28T14:29:28.740Z