Near-Optimal Covering Sequences

Abstract

An (n,R)-covering sequence over a finite alphabet Σq = \0,1,…, q-1\ is a cyclic sequence whose consecutive length-n windows form a covering code of radius R. Equivalently, every word in Σqn is within Hamming distance R of at least one window. We give a deterministic and explicit construction of such sequences whose length, for every fixed alphabet size q, every fixed radius R, and every sufficiently large n, attains the sphere-covering lower bound up to a constant factor depending only on q and R. Thus, in the fixed-radius regime, the construction removes the logarithmic factor in the general probabilistic upper bounds of [Chung and Cooper, Random Structures \& Algorithms, 2004] and [Vu, Advances in Applied Mathematics, 2005]. It also complements the earlier explicit constructions of [Chee, Etzion, Ta, and Vu, Designs, Codes and Cryptography, 2025], which include constant factor bounds for the special binary radius-one families \(n=2a-1\) and \(n=2a\), where \(a1\).