Parameterized Study of the Test Cover Problem

Abstract

We carry out a systematic study of a natural covering problem, used for identification across several areas, in the realm of parameterized complexity. In the Test Cover problem we are given a set [n]=\1,...,n\ of items together with a collection, T, of distinct subsets of these items called tests. We assume that T is a test cover, i.e., for each pair of items there is a test in T containing exactly one of these items. The objective is to find a minimum size subcollection of T, which is still a test cover. The generic parameterized version of Test Cover is denoted by p(k,n,| T|)- Test Cover. Here, we are given ([n],T) and a positive integer parameter k as input and the objective is to decide whether there is a test cover of size at most p(k,n,| T|). We study four parameterizations for Test Cover and obtain the following: (a) k- Test Cover, and (n-k)- Test Cover are fixed-parameter tractable (FPT). (b) (| T|-k)- Test Cover and ( n+k)- Test Cover are W[1]-hard. Thus, it is unlikely that these problems are FPT.