The inverse Voronoi problem in graphs

Abstract

We introduce the inverse Voronoi diagram problem in graphs: given a graph G with positive edge-lengths and a collection U of subsets of vertices of V(G), decide whether U is a Voronoi diagram in G with respect to the shortest-path metric. We show that the problem is NP-hard, even for planar graphs where all the edges have unit length. We also study the parameterized complexity of the problem and show that the problem is W[1]-hard when parameterized by the number of Voronoi cells or by the pathwidth of the graph. For trees we show that the problem can be solved in O(N+n 2 n) time, where n is the number of vertices in the tree and N=n+ΣU∈ U|U| is the size of the description of the input. We also provide a lower bound of (n n) time for trees with n vertices.