An Upper Bound on the Hat Guessing Number of Graphs

Abstract

The hat guessing number HG(G) of a graph is defined by the following game: each player is placed on a vertex and assigned a hat with one of k colors. Each vertex can see only the hat color of the other vertices it is connected to in G. All vertices guess, simultaneously, the color of their own hat. The hat guessing number HG(G) is the largest k such that the players can guarantee that at least one of them guesses correctly. In this paper, we show a general bound on the hat guessing number of a graph G as a function of its order n and its maximum degree Δ. This is the first nontrivial upper bound on HG(G) as a function of Δ and n when Δ≥ ne. From this result we also obtain that the hat guessing number of the random graph Gn,1/2 is at most asymptotically cn for c 0.809, and that graphs with maximum degrees of (1- )n for fixed >0 cannot have HG(G)=(1-o(1))n.

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