Editing graphs to satisfy diversity requirements

Abstract

Let G be a graph where every vertex has a colour and has specified diversity constraints, that is, a minimum number of neighbours of every colour. Every vertex also has a max-degree constraint: an upper bound on the total number of neighbours. In the Min-Edit-Cost problem, we wish to transform G using edge additions and/or deletions into a graph G′ where every vertex satisfies all diversity as well as max-degree constraints. We show an O(n 5 log n) algorithm for the Min-Edit-Cost problem, and an O(n 3 log n log log n) algorithm for the bipartite case. Given a specified number of edge operations, the Max-Satisfied-Nodes problem is to find the maximum number of vertices whose diversity constraints can be satisfied while ensuring that all max-degree constraints are satisfied. We show that the Max-Satisfied-Nodes problem is W[1]-hard, in parameter r+l, where r is the number of edge operations and l is the number of vertices to be satisfied. We also show that it is inapproximable to within a factor of (Formula presented). For certain relaxations of the max-degree constraints, we are able to show constant-factor approximation algorithms for the problem.