On non-expandable cross-bifix-free codes

Abstract

A cross-bifix-free code of length n over Zq is defined as a non-empty subset of Zqn satisfying that the prefix set of each codeword is disjoint from the suffix set of every codeword. Cross-bifix-free codes have found important applications in digital communication systems. One of the main research problems on cross-bifix-free codes is to construct cross-bifix-free codes as large as possible in size. Recently, Wang and Wang introduced a family of cross-bifix-free codes SI,J(k)(n), which is a generalization of the classical cross-bifix-free codes studied early by Lvenshtein, Gilbert and Chee et al.. It is known that SI,J(k)(n) is nearly optimal in size and SI,J(k)(n) is non-expandable if k=n-1 or 1≤ k<n/2. In this paper, we first show that SI,J(k)(n) is non-expandable if and only if k=n-1 or 1≤ k<n/2, thereby improving the results in [Chee et al., IEEE-TIT, 2013] and [Wang and Wang, IEEE-TIT, 2022]. We then construct a new family of cross-bifix-free codes U(t)I,J(n) to expand SI,J(k)(n) such that the resulting larger code SI,J(k)(n) U(t)I,J(n) is a non-expandable cross-bifix-free code whenever SI,J(k)(n) is expandable. Finally, we present an explicit formula for the size of SI,J(k)(n) U(t)I,J(n).