Contracting planar graphs to contractions of triangulations

Abstract

For every graph H, there exists a polynomial-time algorithm deciding if a planar input graph G can be contracted to~H. However, the degree of the polynomial depends on the size of H. In this paper, we identify a class of graphs C such that for every H ∈ C, there exists an algorithm deciding in time f(|V(H)|) · |V(G)|1 whether a planar graph G can be contracted to~H. (The function f(·) does not depend on G.) The class C is the closure of planar triangulated graphs under taking of contractions. In fact, we prove that a graph H ∈ C if and only if there exists a constant cH such that if the tree-width of a graph is at least cH, it contains H as a contraction. We also provide a characterization of C in terms of minimal forbidden contractions.