AbstractWe study some structural properties for tree-decompositions of 2-connected planar graphs that we use to improve upon the runtime of tree-decomposition based dynamic programming approaches for several NP-hard planar graph problems. E.g., we derive the fastest algorithm for Planar Dominating Set of runtime 3tw⋅nO(1), when we take the width tw of a given tree-decomposition as the measure for the exponential worst case behavior. We also introduce a tree-decomposition based approach to solve non-local problems efficiently, such as Planar Hamiltonian Cycle in runtime 6tw⋅nO(1). From any input tree-decomposition of a 2-connected planar graph, one computes in time O(nm) a tree-decomposition with geometric properties, which decomposes the pl...
Many combinatorial problems can be solved in time O∗(ctw) on graphs of treewidth tw, for a problem-s...
Many combinatorial problems can be solved in time O^*(c^{tw}) on graphs of treewidth tw, for a probl...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has...
AbstractWe study some structural properties for tree-decompositions of 2-connected planar graphs tha...
We prove new structural properties for tree-decompositions of planar graphs that we use to improve u...
The notions of branchwidth and branch-decomposition of graphs are introduced by Robertson and Seymou...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
AbstractRecently, there has been significant theoretical progress towards fixed-parameter algorithms...
Recently, new techniques have been introduced to speed up dynamic programming algorithms on tree dec...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
Recently, new techniques have been introduced to speed up dynamic programming algorithms on tree dec...
Tree decompositions were developed by Robertson and Seymour [21]. Since then algorithms have been de...
Abstract: A graph of small branchwidth admits efficient dynamic programming algorithms for many NP-h...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has ...
Many combinatorial problems can be solved in time O∗(ctw) on graphs of treewidth tw, for a problem-s...
Many combinatorial problems can be solved in time O^*(c^{tw}) on graphs of treewidth tw, for a probl...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has...
AbstractWe study some structural properties for tree-decompositions of 2-connected planar graphs tha...
We prove new structural properties for tree-decompositions of planar graphs that we use to improve u...
The notions of branchwidth and branch-decomposition of graphs are introduced by Robertson and Seymou...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
AbstractRecently, there has been significant theoretical progress towards fixed-parameter algorithms...
Recently, new techniques have been introduced to speed up dynamic programming algorithms on tree dec...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
Recently, new techniques have been introduced to speed up dynamic programming algorithms on tree dec...
Tree decompositions were developed by Robertson and Seymour [21]. Since then algorithms have been de...
Abstract: A graph of small branchwidth admits efficient dynamic programming algorithms for many NP-h...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has ...
Many combinatorial problems can be solved in time O∗(ctw) on graphs of treewidth tw, for a problem-s...
Many combinatorial problems can be solved in time O^*(c^{tw}) on graphs of treewidth tw, for a probl...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has...