Optimal strategies in fractional games: vertex cover and domination

Abstract

In a hypergraph with vertex set V and edge set E, a real-valued function f: V [0, 1] is a fractional transversal if Σv∈ e f(v) 1 for every edge e ∈ E. Its size is |f| := Σv ∈ V f(v), and the fractional transversal number is the smallest possible |f|. We consider a game scenario where two players with opposite goals construct a fractional transversal incrementally, trying to minimize and maximize |f|, respectively. We prove that both players have strategies to achieve their common optimum, and they can reach their goals using rational weights.