Almost Optimal Cover-Free Families

Abstract

Roughly speaking, an (n,(r,s))-Cover Free Family (CFF) is a small set of n-bit strings such that: "in any d:=r+s indices we see all patterns of weight r". CFFs have been of interest for a long time both in discrete mathematics as part of block design theory, and in theoretical computer science where they have found a variety of applications, for example, in parametrized algorithms where they were introduced in the recent breakthrough work of Fomin, Lokshtanov and Saurabh under the name `lopsided universal sets'. In this paper we give the first explicit construction of cover-free families of optimal size up to lower order multiplicative terms, for any r and s. In fact, our construction time is almost linear in the size of the family. Before our work, such a result existed only for r=do(1). and r= ω(d/( d d)). As a sample application, we improve the running times of parameterized algorithms from the recent work of Gabizon, Lokshtanov and Pilipczuk.