Bounds on the rate of superimposed codes

Abstract

A binary code is called a superimposed cover-free (s,)-code if the code is identified by the incidence matrix of a family of finite sets in which no intersection of sets is covered by the union of s others. A binary code is called a superimposed list-decoding sL-code if the code is identified by the incidence matrix of a family of finite sets in which the union of any s sets can cover not more than L-1 other sets of the family. For L==1, both of the definitions coincide and the corresponding binary code is called a superimposed s-code. Our aim is to obtain new lower and upper bounds on the rate of given codes. The most interesting result is a lower bound on the rate of superimposed cover-free (s,)-code based on the ensemble of constant-weight binary codes. If parameter 1 is fixed and s∞, then the ratio of this lower bound to the best known upper bound converges to the limit 2\,e-2=0,271. For the classical case =1 and s2, the given Statement means that our recurrent upper bound on the rate of superimposed s-codes obtained in 1982 is attained to within a constant factor a, 0,271 a1