On the Independent Set and Common Subgraph Problems in Random Graphs

Abstract

In this paper, we develop efficient exact and approximate algorithms for computing a maximum independent set in random graphs. In a random graph G, each pair of vertices are joined by an edge with a probability p, where p is a constant between 0 and 1. We show that, a maximum independent set in a random graph that contains n vertices can be computed in expected computation time 2O(22n). Using techniques based on enumeration, we develop an algorithm that can find a largest common subgraph in two random graphs in n and m vertices (m ≤ n) in expected computation time 2O(n12253n). In addition, we show that, with high probability, the parameterized independent set problem is fixed parameter tractable in random graphs and the maximum independent set in a random graph in n vertices can be approximated within a ratio of 2n22n in expected polynomial time.