Almost Cover-Free Codes and Designs

Abstract

An s-subset of codewords of a binary code X is said to be an (s,)-bad in X if the code X contains a subset of other codewords such that the conjunction of the codewords is covered by the disjunctive sum of the s codewords. Otherwise, the s-subset of codewords of X is said to be an (s,)-good in~X.mA binary code X is said to be a cover-free (s,)-code if the code X does not contain (s,)-bad subsets. In this paper, we introduce a natural probabilistic generalization of cover-free (s,)-codes, namely: a binary code is said to be an almost cover-free (s,)-code if almost all s-subsets of its codewords are (s,)-good. We discuss the concept of almost cover-free (s,)-codes arising in combinatorial group testing problems connected with the nonadaptive search of defective supersets (complexes). We develop a random coding method based on the ensemble of binary constant weight codes to obtain lower bounds on the capacity of such codes.