Graph functionality

Abstract

Let G=(V,E) be a graph and A its adjacency matrix. We say that a vertex y ∈ V is a function of vertices x1, …, xk ∈ V if there exists a Boolean function f of k variables such that for any vertex z ∈ V - \y, x1, …, xk\, A(y,z)=f(A(x1,z),…,A(xk,z)). The functionality fun(y) of vertex y is the minimum k such that y is a function of k vertices. The functionality fun(G) of the graph G is Hy∈ V(H)fun(y), where the maximum is taken over all induced subgraphs H of G. In the present paper, we show that functionality generalizes simultaneously several other graph parameters, such as degeneracy or clique-width, by proving that bounded degeneracy or bounded clique-width imply bounded functionality. Moreover, we show that this generalization is proper by revealing classes of graphs of unbounded degeneracy and clique-width, where functionality is bounded by a constant. This includes permutation graphs, unit interval graphs and line graphs. We also observe that bounded functionality implies bounded VC-dimension, i.e. graphs of bounded VC-dimension extend graphs of bounded functionality, and this extension is also proper.