Near-Linear Time Constant-Factor Approximation Algorithm for Branch-Decomposition of Planar Graphs

Abstract

We give an algorithm which for an input planar graph G of n vertices and integer k, in \O(n3n),O(nk2)\ time either constructs a branch-decomposition of G with width at most (2+δ)k, δ>0 is a constant, or a (k+1)× k+12 cylinder minor of G implying bw(G)>k, bw(G) is the branchwidth of G. This is the first O(n) time constant-factor approximation for branchwidth/treewidth and largest grid/cylinder minors of planar graphs and improves the previous \O(n1+ε),O(nk2)\ (ε>0 is a constant) time constant-factor approximations. For a planar graph G and k=bw(G), a branch-decomposition of width at most (2+δ)k and a g× g2 cylinder/grid minor with g=kβ, β>2 is constant, can be computed by our algorithm in \O(n3n k),O(nk2 k)\ time.