Three results towards the approximation of special maximum matchings in graphs

Abstract

For a graph G define the parameters (G) and L(G) as the minimum and maximum value of (G F), where F is a maximum matching of G and (G) is the matching number of G. In this paper, we show that there is a small constant c>0, such that the following decision problem is NP-complete: given a graph G and k≤ |V|2, check whether there is a maximum matching F in G, such that |(G F)-k|≤ c· |V|. Note that when c=1, this problem is polynomial time solvable as we observe in the paper. Since in any graph G, we have L(G)≤ 2(G), any polynomial time algorithm constructing a maximum matching of a graph is a 2-approximation algorithm for (G) and 12-approximation algorithm for L(G). We complement these observations by presenting two inapproximability results for (G) and L(G).