Your search keyword '"Jaffke, Lars"' showing total 15 results

1. Treewidth Is NP-Complete on Cubic Graphs

Author

Hans L. Bodlaender and Édouard Bonnet and Lars Jaffke and Dušan Knop and Paloma T. Lima and Martin Milanič and Sebastian Ordyniak and Sukanya Pandey and Ondřej Suchý, Bodlaender, Hans L., Bonnet, Édouard, Jaffke, Lars, Knop, Dušan, Lima, Paloma T., Milanič, Martin, Ordyniak, Sebastian, Pandey, Sukanya, Suchý, Ondřej, Hans L. Bodlaender and Édouard Bonnet and Lars Jaffke and Dušan Knop and Paloma T. Lima and Martin Milanič and Sebastian Ordyniak and Sukanya Pandey and Ondřej Suchý, Bodlaender, Hans L., Bonnet, Édouard, Jaffke, Lars, Knop, Dušan, Lima, Paloma T., Milanič, Martin, Ordyniak, Sebastian, Pandey, Sukanya, and Suchý, Ondřej

Abstract

In this paper, we show that Treewidth is NP-complete for cubic graphs, thereby improving the result by Bodlaender and Thilikos from 1997 that Treewidth is NP-complete on graphs with maximum degree at most 9. We add a new and simpler proof of the NP-completeness of treewidth, and show that Treewidth remains NP-complete on subcubic induced subgraphs of the infinite 3-dimensional grid.

Published

2023

2. Dynamic Programming on Bipartite Tree Decompositions

Author

Lars Jaffke and Laure Morelle and Ignasi Sau and Dimitrios M. Thilikos, Jaffke, Lars, Morelle, Laure, Sau, Ignasi, Thilikos, Dimitrios M., Lars Jaffke and Laure Morelle and Ignasi Sau and Dimitrios M. Thilikos, Jaffke, Lars, Morelle, Laure, Sau, Ignasi, and Thilikos, Dimitrios M.

Abstract

We revisit a graph width parameter that we dub bipartite treewidth, along with its associated graph decomposition that we call bipartite tree decomposition. Bipartite treewidth can be seen as a common generalization of treewidth and the odd cycle transversal number. Intuitively, a bipartite tree decomposition is a tree decomposition whose bags induce almost bipartite graphs and whose adhesions contain at most one vertex from the bipartite part of any other bag, while the width of such decomposition measures how far the bags are from being bipartite. Adapted from a tree decomposition originally defined by Demaine, Hajiaghayi, and Kawarabayashi [SODA 2010] and explicitly defined by Tazari [Theor. Comput. Sci. 2012], bipartite treewidth appears to play a crucial role for solving problems related to odd-minors, which have recently attracted considerable attention. As a first step toward a theory for solving these problems efficiently, the main goal of this paper is to develop dynamic programming techniques to solve problems on graphs of small bipartite treewidth. For such graphs, we provide a number of para-NP-completeness results, FPT-algorithms, and XP-algorithms, as well as several open problems. In particular, we show that K_t-Subgraph-Cover, Weighted Vertex Cover/Independent Set, Odd Cycle Transversal, and Maximum Weighted Cut are FPT parameterized by bipartite treewidth. We also provide the following complexity dichotomy when H is a 2-connected graph, for each of the H-Subgraph-Packing, H-Induced-Packing, H-Scattered-Packing, and H-Odd-Minor-Packing problems: if H is bipartite, then the problem is para-NP-complete parameterized by bipartite treewidth while, if H is non-bipartite, then the problem is solvable in XP-time. Beyond bipartite treewidth, we define 1-ℋ-treewidth by replacing the bipartite graph class by any graph class ℋ. Most of the technology developed here also works for this more general parameter.

Published

2023

3. XNLP-Completeness for Parameterized Problems on Graphs with a Linear Structure

Author

Hans L. Bodlaender and Carla Groenland and Hugo Jacob and Lars Jaffke and Paloma T. Lima, Bodlaender, Hans L., Groenland, Carla, Jacob, Hugo, Jaffke, Lars, Lima, Paloma T., Hans L. Bodlaender and Carla Groenland and Hugo Jacob and Lars Jaffke and Paloma T. Lima, Bodlaender, Hans L., Groenland, Carla, Jacob, Hugo, Jaffke, Lars, and Lima, Paloma T.

Abstract

In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by linear width measures. This strengthens existing W[1]-hardness proofs for these problems, since XNLP-hardness implies W[t]-hardness for all t. It also indicates, via a conjecture by Pilipczuk and Wrochna [ToCT 2018], that any XP algorithm for such problems is likely to require XP space. In particular, we show XNLP-completeness for natural problems parameterized by pathwidth, linear clique-width, and linear mim-width. The problems we consider are Independent Set, Dominating Set, Odd Cycle Transversal, (q-)Coloring, Max Cut, Maximum Regular Induced Subgraph, Feedback Vertex Set, Capacitated (Red-Blue) Dominating Set, and Bipartite Bandwidth.

Published

2022

4. Classes of Intersection Digraphs with Good Algorithmic Properties

Author

Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, Telle, Jan Arne, Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, and Telle, Jan Arne

Abstract

While intersection graphs play a central role in the algorithmic analysis of hard problems on undirected graphs, the role of intersection digraphs in algorithms is much less understood. We present several contributions towards a better understanding of the algorithmic treatment of intersection digraphs. First, we introduce natural classes of intersection digraphs that generalize several classes studied in the literature. Second, we define the directed locally checkable vertex (DLCV) problems, which capture many well-studied problems on digraphs such as (Independent) Dominating Set, Kernel, and H-Homomorphism. Third, we give a new width measure of digraphs, bi-mim-width, and show that the DLCV problems are polynomial-time solvable when we are provided a decomposition of small bi-mim-width. Fourth, we show that several classes of intersection digraphs have bounded bi-mim-width, implying that we can solve all DLCV problems on these classes in polynomial time given an intersection representation of the input digraph. We identify reflexivity as a useful condition to obtain intersection digraph classes of bounded bi-mim-width, and therefore to obtain positive algorithmic results.

Published

2022

5. A Unifying Framework for Characterizing and Computing Width Measures

Author

Eduard Eiben and Robert Ganian and Thekla Hamm and Lars Jaffke and O-joung Kwon, Eiben, Eduard, Ganian, Robert, Hamm, Thekla, Jaffke, Lars, Kwon, O-joung, Eduard Eiben and Robert Ganian and Thekla Hamm and Lars Jaffke and O-joung Kwon, Eiben, Eduard, Ganian, Robert, Hamm, Thekla, Jaffke, Lars, and Kwon, O-joung

Abstract

Algorithms for computing or approximating optimal decompositions for decompositional parameters such as treewidth or clique-width have so far traditionally been tailored to specific width parameters. Moreover, for mim-width, no efficient algorithms for computing good decompositions were known, even under highly restrictive parameterizations. In this work we identify ℱ-branchwidth as a class of generic decompositional parameters that can capture mim-width, treewidth, clique-width as well as other measures. We show that while there is an infinite number of ℱ-branchwidth parameters, only a handful of these are asymptotically distinct. We then develop fixed-parameter and kernelization algorithms (under several structural parameterizations) that can approximate every possible ℱ-branchwidth, providing a unifying parameterized framework that can efficiently obtain near-optimal tree-decompositions, k-expressions, as well as optimal mim-width decompositions.

Published

2022

6. enTaming Graphs with No Large Creatures and Skinny Ladders

Author

Gajarský, Jakub, Jaffke, Lars, Lima, Paloma T., Novotná, Jana, Pilipczuk, Marcin, Rzążewski, Paweł, Souza, Uéverton S., Chechik, Shiri, Navarro, Gonzalo, Rotenberg, Eva, and Herman, Grzegorz

Subjects

FOS: Computer and information sciences, hereditary graph class, Mathematics of computing → Graph theory, Discrete Mathematics (cs.DM), Computer Science - Data Structures and Algorithms, FOS: Mathematics, Mathematics - Combinatorics, Data Structures and Algorithms (cs.DS), Combinatorics (math.CO), Minimal separator, Computer Science - Discrete Mathematics

Abstract

We confirm a conjecture of Gartland and Lokshtanov [arXiv:2007.08761]: if for a hereditary graph class 𝒢 there exists a constant k such that no member of 𝒢 contains a k-creature as an induced subgraph or a k-skinny-ladder as an induced minor, then there exists a polynomial p such that every G ∈ 𝒢 contains at most p(|V(G)|) minimal separators. By a result of Fomin, Todinca, and Villanger [SIAM J. Comput. 2015] the latter entails the existence of polynomial-time algorithms for Maximum Weight Independent Set, Feedback Vertex Set and many other problems, when restricted to an input graph from 𝒢. Furthermore, as shown by Gartland and Lokshtanov, our result implies a full dichotomy of hereditary graph classes defined by a finite set of forbidden induced subgraphs into tame (admitting a polynomial bound of the number of minimal separators) and feral (containing infinitely many graphs with exponential number of minimal separators)., LIPIcs, Vol. 244, 30th Annual European Symposium on Algorithms (ESA 2022), pages 58:1-58:8

Published

2022

7. b-Coloring Parameterized by Clique-Width

Author

Jaffke, Lars, Lima, Paloma Thome de, and Lokshtanov, Daniel

Subjects

FOS: Computer and information sciences, F.2.2, G.2.2, Discrete Mathematics (cs.DM), 05C85, 05C15, b-Coloring, vertex cover, structural parameterization, Computer Science - Data Structures and Algorithms, Mathematics of computing → Graph coloring, Data Structures and Algorithms (cs.DS), Computer Science - Discrete Mathematics, MathematicsofComputing_DISCRETEMATHEMATICS, clique-width

Abstract

We provide a polynomial-time algorithm for b-Coloring on graphs of constant clique-width. This unifies and extends nearly all previously known polynomial-time results on graph classes, and answers open questions posed by Campos and Silva [Algorithmica, 2018] and Bonomo et al. [Graphs Combin., 2009]. This constitutes the first result concerning structural parameterizations of this problem. We show that the problem is FPT when parameterized by the vertex cover number on general graphs, and on chordal graphs when parameterized by the number of colors. Additionally, we observe that our algorithm for graphs of bounded clique-width can be adapted to solve the Fall Coloring problem within the same runtime bound. The running times of the clique-width based algorithms for b-Coloring and Fall Coloring are tight under the Exponential Time Hypothesis., LIPIcs, Vol. 187, 38th International Symposium on Theoretical Aspects of Computer Science (STACS 2021), pages 43:1-43:15

Published

2021

8. b-Coloring Parameterized by Clique-Width

Author

Lars Jaffke and Paloma T. Lima and Daniel Lokshtanov, Jaffke, Lars, Lima, Paloma T., Lokshtanov, Daniel, Lars Jaffke and Paloma T. Lima and Daniel Lokshtanov, Jaffke, Lars, Lima, Paloma T., and Lokshtanov, Daniel

Abstract

We provide a polynomial-time algorithm for b-Coloring on graphs of constant clique-width. This unifies and extends nearly all previously known polynomial-time results on graph classes, and answers open questions posed by Campos and Silva [Algorithmica, 2018] and Bonomo et al. [Graphs Combin., 2009]. This constitutes the first result concerning structural parameterizations of this problem. We show that the problem is FPT when parameterized by the vertex cover number on general graphs, and on chordal graphs when parameterized by the number of colors. Additionally, we observe that our algorithm for graphs of bounded clique-width can be adapted to solve the Fall Coloring problem within the same runtime bound. The running times of the clique-width based algorithms for b-Coloring and Fall Coloring are tight under the Exponential Time Hypothesis.

Published

2021

9. Typical Sequences Revisited: Computing Width Parameters of Graphs

Author

Sub Algorithms and Complexity, Algorithms and Complexity, Bodlaender, Hans L., Jaffke, Lars, Telle, Jan Arne, Paul, Christophe, Bläser, Markus, Sub Algorithms and Complexity, Algorithms and Complexity, Bodlaender, Hans L., Jaffke, Lars, Telle, Jan Arne, Paul, Christophe, and Bläser, Markus

Published

2020

10. Typical Sequences Revisited - Computing Width Parameters of Graphs

Author

Hans L. Bodlaender and Lars Jaffke and Jan Arne Telle, Bodlaender, Hans L., Jaffke, Lars, Telle, Jan Arne, Hans L. Bodlaender and Lars Jaffke and Jan Arne Telle, Bodlaender, Hans L., Jaffke, Lars, and Telle, Jan Arne

Abstract

In this work, we give a structural lemma on merges of typical sequences, a notion that was introduced in 1991 [Lagergren and Arnborg, Bodlaender and Kloks, both ICALP 1991] to obtain constructive linear time parameterized algorithms for treewidth and pathwidth. The lemma addresses a runtime bottleneck in those algorithms but so far it does not lead to asymptotically faster algorithms. However, we apply the lemma to show that the cutwidth and the modified cutwidth of series parallel digraphs can be computed in ?(n²) time.

Published

2020

11. A Complexity Dichotomy for Critical Values of the b-Chromatic Number of Graphs

Author

Lars Jaffke and Paloma T. Lima, Jaffke, Lars, Lima, Paloma T., Lars Jaffke and Paloma T. Lima, Jaffke, Lars, and Lima, Paloma T.

Abstract

A b-coloring of a graph G is a proper coloring of its vertices such that each color class contains a vertex that has at least one neighbor in all the other color classes. The b-Coloring problem asks whether a graph G has a b-coloring with k colors. The b-chromatic number of a graph G, denoted by chi_b(G), is the maximum number k such that G admits a b-coloring with k colors. We consider the complexity of the b-Coloring problem, whenever the value of k is close to one of two upper bounds on chi_b(G): The maximum degree Delta(G) plus one, and the m-degree, denoted by m(G), which is defined as the maximum number i such that G has i vertices of degree at least i-1. We obtain a dichotomy result for all fixed k in N when k is close to one of the two above mentioned upper bounds. Concretely, we show that if k in {Delta(G) + 1 - p, m(G) - p}, the problem is polynomial-time solvable whenever p in {0, 1} and, even when k = 3, it is NP-complete whenever p >= 2. We furthermore consider parameterizations of the b-Coloring problem that involve the maximum degree Delta(G) of the input graph G and give two FPT-algorithms. First, we show that deciding whether a graph G has a b-coloring with m(G) colors is FPT parameterized by Delta(G). Second, we show that b-Coloring{} is FPT parameterized by Delta(G) + l_k(G), where l_k(G) denotes the number of vertices of degree at least k.

Published

2019

12. Generalized Distance Domination Problems and Their Complexity on Graphs of Bounded mim-width

Author

Lars Jaffke and O-joung Kwon and Torstein J. F. Strømme and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, Strømme, Torstein J. F., Telle, Jan Arne, Lars Jaffke and O-joung Kwon and Torstein J. F. Strømme and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, Strømme, Torstein J. F., and Telle, Jan Arne

Abstract

We generalize the family of (sigma, rho)-problems and locally checkable vertex partition problems to their distance versions, which naturally captures well-known problems such as distance-r dominating set and distance-r independent set. We show that these distance problems are XP parameterized by the structural parameter mim-width, and hence polynomial on graph classes where mim-width is bounded and quickly computable, such as k-trapezoid graphs, Dilworth k-graphs, (circular) permutation graphs, interval graphs and their complements, convex graphs and their complements, k-polygon graphs, circular arc graphs, complements of d-degenerate graphs, and H-graphs if given an H-representation. To supplement these findings, we show that many classes of (distance) (sigma, rho)-problems are W[1]-hard parameterized by mim-width + solution size.

Published

2019

13. A Unified Polynomial-Time Algorithm for Feedback Vertex Set on Graphs of Bounded Mim-Width

Author

Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, Telle, Jan Arne, Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, and Telle, Jan Arne

Abstract

We give a first polynomial-time algorithm for (Weighted) Feedback Vertex Set on graphs of bounded maximum induced matching width (mim-width). Explicitly, given a branch decomposition of mim-width w, we give an n^{O(w)}-time algorithm that solves Feedback Vertex Set. This provides a unified algorithm for many well-known classes, such as Interval graphs and Permutation graphs, and furthermore, it gives the first polynomial-time algorithms for other classes of bounded mim-width, such as Circular Permutation and Circular k-Trapezoid graphs for fixed k. In all these classes the decomposition is computable in polynomial time, as shown by Belmonte and Vatshelle [Theor. Comput. Sci. 2013]. We show that powers of graphs of tree-width w-1 or path-width w and powers of graphs of clique-width w have mim-width at most w. These results extensively provide new classes of bounded mim-width. We prove a slight strengthening of the first statement which implies that, surprisingly, Leaf Power graphs which are of importance in the field of phylogenetic studies have mim-width at most 1. Given a tree decomposition of width w-1, a path decomposition of width w, or a clique-width w-expression of a graph G, one can for any value of k find a mim-width decomposition of its k-power in polynomial time, and apply our algorithm to solve Feedback Vertex Set on the k-power in time n^{O(w)}. In contrast to Feedback Vertex Set, we show that Hamiltonian Cycle is NP-complete even on graphs of linear mim-width 1, which further hints at the expressive power of the mim-width parameter.

Published

2018

14. Polynomial-Time Algorithms for the Longest Induced Path and Induced Disjoint Paths Problems on Graphs of Bounded Mim-Width

Author

Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, Telle, Jan Arne, Lars Jaffke and O-joung Kwon and Jan Arne Telle, Jaffke, Lars, Kwon, O-joung, and Telle, Jan Arne

Abstract

We give the first polynomial-time algorithms on graphs of bounded maximum induced matching width (mim-width) for problems that are not locally checkable. In particular, we give n^O(w)-time algorithms on graphs of mim-width at most w, when given a decomposition, for the following problems: Longest Induced Path, Induced Disjoint Paths and H-Induced Topological Minor for fixed H. Our results imply that the following graph classes have polynomial-time algorithms for these three problems: Interval and Bi-Interval graphs, Circular Arc, Per- mutation and Circular Permutation graphs, Convex graphs, k-Trapezoid, Circular k-Trapezoid, k-Polygon, Dilworth-k and Co-k-Degenerate graphs for fixed k.

Published

2018

15. Definability Equals Recognizability for k-Outerplanar Graphs

Author

Lars Jaffke and Hans L. Bodlaender, Jaffke, Lars, Bodlaender, Hans L., Lars Jaffke and Hans L. Bodlaender, Jaffke, Lars, and Bodlaender, Hans L.

Abstract

One of the most famous algorithmic meta-theorems states that every graph property that can be defined by a sentence in counting monadic second order logic (CMSOL) can be checked in linear time for graphs of bounded treewidth, which is known as Courcelle's Theorem. These algorithms are constructed as finite state tree automata, and hence every CMSOL-definable graph property is recognizable. Courcelle also conjectured that the converse holds, i.e., every recognizable graph property is definable in CMSOL for graphs of bounded treewidth. We prove this conjecture for k-outerplanar graphs, which are known to have treewidth at most 3k-1.

Published

2015