Tight inapproximability of Nash equilibria in public goods games

We study public goods games, a type of game where every player has to decide whether or not to produce a good which is public , i.e., neighboring players can also benefit from it. Specifically, we consider a setting where the good is indivisible and where the neighborhood structure is represented by a directed graph, with the players being the nodes. Papadimitriou and Peng (2023) recently showed that in this setting computing mixed Nash equilibria is PPAD-hard, and that this remains the case even for epsilon-well-supported approximate equilibria for some sufficiently small constant epsilon. In this work, we strengthen this inapproximability result by showing that the problem remains PPAD-hard for any non-trivial approximation parameter epsilon.