Rani Hod, Alon Naor
Published 2013-01-02Version 1
We study the (1:b) Maker-Breaker component game, played on the edge set of a d-regular graph. Maker's aim in this game is to build a large connected component, while Breaker's aim is to not let him do so. For all values of Breaker's bias b, we determine whether Breaker wins (on any d-regular graph) or Maker wins (on almost every d-regular graph) and provide explicit winning strategies for both players. To this end, we prove an extension of a theorem by Gallai-Hasse-Roy-Vitaver about graph orientations without long directed simple paths.
On maximum matchings in almost regular graphs
Uniqueness of the extremal graph in the problem of maximizing the number of independent sets in regular graphs
Sequential edge-coloring on the subset of vertices of almost regular graphs
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