Network pearls climb stairs: a new game on graphs and its optimal solution

Abstract

Let G be a graph, and a and b be integers. Suppose there are infinite number of stairs, numbering level 0, level 1, etc. How do you place every vertex of the graph G on a level as high as possible such that a vertex placed on level i should have at least i-b neighbors among the vertices placed on level i and above while have at least i neighbors among the vertices placed on level i-a and above? This new game on graphs is referred to as ``network pearls climb stairs". In this paper, we develop a more general theory, notably a correspondence between structure and dynamics, which particularly leads to the optimal solution of the game. Moreover, as a and b vary, the corresponding level numbers for a vertex obviously provide a structural profile (or spectrum) for the vertex the applications of which are worthy of further study.