Positional games on randomly perturbed graphs

Abstract

Maker-Breaker games are played on a hypergraph (X,F), where F ⊂eq 2X denotes the family of winning sets. Both players alternately claim a predefined amount of edges (called bias) from the board X, and Maker wins the game if she is able to occupy any winning set F ∈ F. These games are well studied when played on the complete graph Kn or on a random graph Gn,p. In this paper we consider Maker-Breaker games played on randomly perturbed graphs instead. These graphs consist of the union of a deterministic graph Gα with minimum degree at least α n and a binomial random graph Gn,p. Depending on α and Breaker's bias b we determine the order of the threshold probability for winning the Hamiltonicity game and the k-connectivity game on Gα Gn,p, and we discuss the H-game when b=1. Furthermore, we give optimal results for the Waiter-Client versions of all mentioned games.