On the Dominating Set Problem in Random Graphs

Abstract

In this paper, we study the Dominating Set problem in random graphs. In a random graph, each pair of vertices are joined by an edge with a probability of p, where p is a positive constant less than 1. We show that, given a random graph in n vertices, a minimum dominating set in the graph can be computed in expected 2O(22n) time. For the parameterized dominating set problem, we show that it cannot be solved in expected O(f(k)nc) time unless the minimum dominating set problem can be approximated within a ratio of o(2n) in expected polynomial time, where f(k) is a function of the parameter k and c is a constant independent of n and k. In addition, we show that the parameterized dominating set problem can be solved in expected O(f(k)nc) time when the probability p depends on n and equals to 1g(n), where g(n)< n is a monotonously increasing function of n and its value approaches infinity when n approaches infinity.