Complexity of inheritance of F-convexity for restricted games induced by minimum partitions

Abstract

Let G = (N,E,w) be a weighted communication graph (with weight function w on E). For every subset A ⊂eq N, we delete in the subset E(A) of edges with ends in A, all edges of minimum weight in E(A). Then the connected components of the corresponding induced subgraph constitute a partition of A that we call P(A). For every game (N, v), we define the P-restricted game (N, v) by v(A) = ΣF ∈ P(A) v(F) for all A ⊂eq N. We prove that we can decide in polynomial time if there is inheritance of F-convexity from (N, v) to the P-restricted game (N, v) where F-convexity is obtained by restricting convexity to connected subsets.