Your search keyword '"Graph factors"' showing total 17 results

1. The complexity of binary matrix completion under diameter constraints.

Author

Koana, Tomohiro, Froese, Vincent, and Niedermeier, Rolf

Subjects

*HAMMING distance, *DIAMETER, *SET theory, *NP-hard problems, *MATRICES (Mathematics), *POLYNOMIAL time algorithms, *ALGORITHMS

Abstract

We thoroughly study a novel but basic combinatorial matrix completion problem: Given a binary incomplete matrix, fill in the missing entries so that every pair of rows in the resulting matrix has a Hamming distance within a specified range. We obtain an almost complete picture of the complexity landscape regarding the distance constraints and the maximum number of missing entries in any row. We develop polynomial-time algorithms for maximum diameter three based on Deza's theorem (1973) [11] from extremal set theory. We also prove NP-hardness for diameter at least four. For the number of missing entries per row, we show polynomial-time solvability when there is only one and NP-hardness when there can be at least two. In many of our algorithms, we heavily rely on Deza's theorem to identify sunflower structures. This paves the way towards polynomial-time algorithms which are based on finding graph factors and solving 2-SAT instances. [ABSTRACT FROM AUTHOR]

Published

2023

2. The double Hall property and cycle covers in bipartite graphs.

Author

Barát, János, Grzesik, Andrzej, Jung, Attila, Nagy, Zoltán Lóránt, and Pálvölgyi, Dömötör

Subjects

*BIPARTITE graphs, *LOGICAL prediction

Abstract

In a graph G , the 2-neighborhood of a vertex set X consists of all vertices of G having at least 2 neighbors in X. We say that a bipartite graph G (A , B) satisfies the double Hall property if | A | ≥ 2 , and every subset X ⊆ A of size at least 2 has a 2-neighborhood of size at least | X |. Salia conjectured that any bipartite graph G (A , B) satisfying the double Hall property contains a cycle covering A. Here, we prove the existence of a 2-factor covering A in any bipartite graph G (A , B) satisfying the double Hall property. We also show Salia's conjecture for graphs with restricted degrees of vertices in B. Additionally, we prove a lower bound on the number of edges in a graph satisfying the double Hall property, and the bound is sharp up to a constant factor. [ABSTRACT FROM AUTHOR]

Published

2024

3. Regular Colorings in Regular Graphs

Author

Bernshteyn Anton, Khormali Omid, Martin Ryan R., Rollin Jonathan, Rorabaugh Danny, Shan Songling, and Uzzell Andrew J.

Subjects

edge coloring, graph factors, regular graphs, 05c15, Mathematics, QA1-939

Abstract

An (r − 1, 1)-coloring of an r-regular graph G is an edge coloring (with arbitrarily many colors) such that each vertex is incident to r − 1 edges of one color and 1 edge of a different color. In this paper, we completely characterize all 4-regular pseudographs (graphs that may contain parallel edges and loops) which do not have a (3, 1)-coloring. Also, for each r ≥ 6 we construct graphs that are not (r −1, 1)-colorable and, more generally, are not (r − t, t)-colorable for small t.

Published

2020

4. Minimum Reload Cost Graph Factors

Author

Baste, Julien, Gözüpek, Didem, Shalom, Mordechai, Thilikos, Dimitrios M., Hutchison, David, Series Editor, Kanade, Takeo, Series Editor, Kittler, Josef, Series Editor, Kleinberg, Jon M., Series Editor, Mattern, Friedemann, Series Editor, Mitchell, John C., Series Editor, Naor, Moni, Series Editor, Pandu Rangan, C., Series Editor, Steffen, Bernhard, Series Editor, Terzopoulos, Demetri, Series Editor, Tygar, Doug, Series Editor, Catania, Barbara, editor, Královič, Rastislav, editor, Nawrocki, Jerzy, editor, and Pighizzini, Giovanni, editor

Published

2019

5. Minimum Reload Cost Graph Factors.

Author

Baste, Julien, Gözüpek, Didem, Shalom, Mordechai, and Thilikos, Dimitrios M.

Subjects

*SPANNING trees, *GRAPH coloring, *PLANAR graphs, *TELECOMMUNICATION systems, *MAXIMA & minima, *COST, *NP-hard problems

Abstract

The concept of Reload cost in a graph refers to the cost that occurs while traversing a vertex via two of its incident edges. This cost is uniquely determined by the colors of the two edges. This concept has various applications in transportation networks, communication networks, and energy distribution networks. Various problems using this model are defined and studied in the literature. The problem of finding a spanning tree whose diameter with respect to the reload costs is smallest possible, the problems of finding a path, trail or walk with minimum total reload cost between two given vertices, problems about finding a proper edge coloring of a graph such that the total reload cost is minimized, the problem of finding a spanning tree such that the sum of the reload costs of all paths between all pairs of vertices is minimized, and the problem of finding a set of cycles of minimum reload cost, that cover all the vertices of a graph, are examples of such problems. In this work we focus on the last problem. Noting that a cycle cover of a graph is a 2-factor of it, we generalize the problem to the problem of finding an r-factor of minimum reload cost of an edge colored graph. We prove several NP-hardness results for special cases of the problem. Namely, bounded degree graphs, planar graphs, bounded total cost, and bounded number of distinct costs. For the special case of r = 2, our results imply an improved NP-hardness result. On the positive side, we present a polynomial-time solvable special case which provides a tight boundary between the polynomial and hard cases in terms of r and the maximum degree of the graph. We then investigate the parameterized complexity of the problem, prove W[1]-hardness results and present an FPT-algorithm. [ABSTRACT FROM AUTHOR]

Published

2021

6. Factorizing regular graphs.

Author

Thomassen, Carsten

Subjects

*REGULAR graphs, *PLANAR graphs, *NATURAL numbers, *GEOMETRIC vertices

Abstract

Every 9-regular graph (possibly with multiple edges) with odd edge-connectivity >5 can be edge-decomposed into three 3-factors. If Tutte's 3-flow conjecture is true, it also holds for all 9-regular graphs with odd edge-connectivity 5, but not with odd edge-connectivity 3. It holds for all planar 2-edge-connected 9-regular graphs, an equivalent version of the 4-color theorem for planar graphs. We address the more general question: If G is an r -regular graph, and r = k q where k , q are natural numbers >1, can G be edge-decomposed into k q -factors? If q is even, then the decomposition exists trivially. If k , q are both odd, then we prove that the decomposition exists if G has odd edge-connectivity (size of smallest odd edge-cut) at least 3 k − 2 , which is satisfied if the odd edge-connectivity is at least r − 2. If q is odd and k is even, then we must require that G has an even number of vertices just to guarantee that G has a q -factor. If we want a decomposition into q -factors, then we also need the condition that, for any partition of the vertex set of G into two odd parts, there must be at least k edges between the parts. We prove that the edge-decomposition into q -factors is always possible if G has an even number of vertices and the edge-connectivity of G is at least 2 k 2 + k. [ABSTRACT FROM AUTHOR]

Published

2020

7. Approximation Algorithms for Connected Graph Factors of Minimum Weight.

Author

Cornelissen, Kamiel, Hoeksma, Ruben, Manthey, Bodo, Narayanaswamy, N. S., S. Rahul, C., and Waanders, Marten

Subjects

*SUBGRAPHS, *GRAPH connectivity, *PATHS & cycles in graph theory, *APPROXIMATION algorithms, *TRAVELING salesman problem, *TOPOLOGICAL degree

Abstract

Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental problem in the area of network design. We consider the problem of finding d-regular spanning subgraphs (or d-factors) of minimum weight with connectivity requirements. For the case of k-edge-connectedness, we present approximation algorithms that achieve constant approximation ratios for all d≥2.⌈k/2⌉. For the case of k-vertex-connectedness, we achieve constant approximation ratios for d≥2k-1. Our algorithms also work for arbitrary degree sequences if the minimum degree is at least 2.⌈k/2⌉ (for k-edge-connectivity) or 2k-1 (for k-vertex-connectivity). To complement our approximation algorithms, we prove that the problem with simple connectivity cannot be approximated better than the traveling salesman problem. In particular, the problem is A P X-hard. [ABSTRACT FROM AUTHOR]

Published

2018

8. Partitioning Perfect Graphs into Stars.

Author

Bevern, René, Bredereck, Robert, Bulteau, Laurent, Chen, Jiehua, Froese, Vincent, Niedermeier, Rolf, and Woeginger, Gerhard J.

Subjects

*PERFECT graphs, *PARTITIONS (Mathematics), *SUBGRAPHS, *MATCHING theory, *NP-complete problems

Abstract

The partition of graphs into 'nice' subgraphs is a central algorithmic problem with strong ties to matching theory. We study the partitioning of undirected graphs into same-size stars, a problem known to be NP-complete even for the case of stars on three vertices. We perform a thorough computational complexity study of the problem on subclasses of perfect graphs and identify several polynomial-time solvable cases, for example, on interval graphs and bipartite permutation graphs, and also NP-complete cases, for example, on grid graphs and chordal graphs. [ABSTRACT FROM AUTHOR]

Published

2017

9. Binary Matrix Completion Under Diameter Constraints

Author

Tomohiro Koana and Vincent Froese and Rolf Niedermeier, Koana, Tomohiro, Froese, Vincent, Niedermeier, Rolf, Tomohiro Koana and Vincent Froese and Rolf Niedermeier, Koana, Tomohiro, Froese, Vincent, and Niedermeier, Rolf

Abstract

We thoroughly study a novel but basic combinatorial matrix completion problem: Given a binary incomplete matrix, fill in the missing entries so that the resulting matrix has a specified maximum diameter (that is, upper-bounding the maximum Hamming distance between any two rows of the completed matrix) as well as a specified minimum Hamming distance between any two of the matrix rows. This scenario is closely related to consensus string problems as well as to recently studied clustering problems on incomplete data. We obtain an almost complete picture concerning the complexity landscape (P vs NP) regarding the diameter constraints and regarding the number of missing entries per row of the incomplete matrix. We develop polynomial-time algorithms for maximum diameter three, which are based on Deza’s theorem [Discret. Math. 1973, J. Comb. Theory, Ser. B 1974] from extremal set theory. In this way, we also provide one of the rare links between sunflower techniques and stringology. On the negative side, we prove NP-hardness for diameter at least four. For the number of missing entries per row, we show polynomial-time solvability when there is only one missing entry and NP-hardness when there can be at least two missing entries. In general, our algorithms heavily rely on Deza’s theorem and the correspondingly identified sunflower structures pave the way towards solutions based on computing graph factors and solving 2-SAT instances.

Published

2021

10. Binary Matrix Completion Under Diameter Constraints

Author

Koana, Tomohiro, Froese, Vincent, and Niedermeier, Rolf

Subjects

combinatorial algorithms, graph factors, Hamming distance, Hamming radius, stringology, consensus problems, binary matrices, Theory of computation → Design and analysis of algorithms, 2-Sat, Mathematics of computing → Discrete mathematics, sunflowers, complexity dichotomy

Abstract

We thoroughly study a novel but basic combinatorial matrix completion problem: Given a binary incomplete matrix, fill in the missing entries so that the resulting matrix has a specified maximum diameter (that is, upper-bounding the maximum Hamming distance between any two rows of the completed matrix) as well as a specified minimum Hamming distance between any two of the matrix rows. This scenario is closely related to consensus string problems as well as to recently studied clustering problems on incomplete data. We obtain an almost complete picture concerning the complexity landscape (P vs NP) regarding the diameter constraints and regarding the number of missing entries per row of the incomplete matrix. We develop polynomial-time algorithms for maximum diameter three, which are based on Deza’s theorem [Discret. Math. 1973, J. Comb. Theory, Ser. B 1974] from extremal set theory. In this way, we also provide one of the rare links between sunflower techniques and stringology. On the negative side, we prove NP-hardness for diameter at least four. For the number of missing entries per row, we show polynomial-time solvability when there is only one missing entry and NP-hardness when there can be at least two missing entries. In general, our algorithms heavily rely on Deza’s theorem and the correspondingly identified sunflower structures pave the way towards solutions based on computing graph factors and solving 2-SAT instances., LIPIcs, Vol. 187, 38th International Symposium on Theoretical Aspects of Computer Science (STACS 2021), pages 47:1-47:14

Published

2021

11. Partitioning perfect graphs into stars

Subjects

graph algorithms, graph factors, P-Partition, generalized matching problem, graph packing, MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

The partition of graphs into “nice” subgraphs is a central algorithmic problem with strong ties to matching theory. We study the partitioning of undirected graphs into same-size stars, a problem known to be NP-complete even for the case of stars on three vertices. We perform a thorough computational complexity study of the problem on subclasses of perfect graphs and identify several polynomial-time solvable cases, for example, on interval graphs and bipartite permutation graphs, and also NP-complete cases, for example, on grid graphs and chordal graphs.

Published

2017

12. Approximating bounded-degree spanning trees and connected factors with leaves

Author

Walter Kern, Bodo Manthey, and Discrete Mathematics and Mathematical Programming

Subjects

Vertex (graph theory), Discrete mathematics, Spanning tree, Applied Mathematics, Shortest-path tree, Neighbourhood (graph theory), Approximation algorithm, 0102 computer and information sciences, 02 engineering and technology, Management Science and Operations Research, Minimum spanning tree, 01 natural sciences, Approximation algorithms, Industrial and Manufacturing Engineering, Connected dominating set, IR-103354, Combinatorics, Graph factors, 010201 computation theory & mathematics, Kruskal's algorithm, 0202 electrical engineering, electronic engineering, information engineering, 020201 artificial intelligence & image processing, EWI-27055, Software, Mathematics

Abstract

We present constant factor approximation algorithms for the following two problems: First, given a connected graph $G=(V,E)$ with non-negative edge weights, find a minimum weight spanning tree that respects prescribed upper bounds on the vertex degrees. Second, given prescribed (exact) vertex degrees $d=(d_i)_{i \in V}$, find a minimum weight connected $d$-factor. Constant factor approximation algorithms for these problems were known only for the case that $d_i \geq 2$ for all $i \in V$.

Published

2017

13. The Complexity of Finding S-Factors in Regular Graphs

Author

Sanjana Kolisetty and Linh Le and Ilya Volkovich and Mihalis Yannakakis, Kolisetty, Sanjana, Le, Linh, Volkovich, Ilya, Yannakakis, Mihalis, Sanjana Kolisetty and Linh Le and Ilya Volkovich and Mihalis Yannakakis, Kolisetty, Sanjana, Le, Linh, Volkovich, Ilya, and Yannakakis, Mihalis

Abstract

A graph G has an S-factor if there exists a spanning subgraph F of G such that for all v in V: deg_F(v) in S. The simplest example of such factor is a 1-factor, which corresponds to a perfect matching in a graph. In this paper we study the computational complexity of finding S-factors in regular graphs. Our techniques combine some classical as well as recent tools from graph theory.

Published

2019

14. Factorizing regular graphs

Author

Thomassen, Carsten and Thomassen, Carsten

Abstract

Every 9-regular graph (possibly with multiple edges) with odd edge-connectivity > 5 can be edge-decomposed into three 3-factors. If Tutte’s 3-flow conjecture is true, it also holds for all 9-regular graphs with odd edge-connectivity 5, but not with odd edge-connectivity 3. It holds for all planar 2-edge-connected 9-regular graphs, an equivalent version of the 4-color theorem for planar graphs. We address the more general question: If G is an r-regular graph, and r = kq where k,q are natural numbers > 1, can G be edge-decomposed into k q-factors? If q is even, then the decomposition exists trivially. If k,q are both odd, then we prove that the decomposition exists if G has odd edgeconnectivity (size of smallest odd edge-cut) at least 3k −2, which is satisfied if the odd edge-connectivity is at least r−2. If q is odd and k is even, then we must require that G has an even number of vertices just to guarantee that G has a q-factor. If we want a decomposition into q-factors, then we also need the condition that, for any partition of the vertex set of G into two odd parts, there must be at least k edges between the parts. We prove that the edge-decomposition into q-factors is always possible if G has an even number of vertices and the edge-connectivity of G is at least 2k2 + k.

Published

2019

15. Minimum Reload Cost Graph Factors

Author

Julien Baste, Mordechai Shalom, Didem Gözüpek, Dimitrios M. Thilikos, École normale supérieure - Cachan, antenne de Bretagne (ENS Cachan Bretagne), École normale supérieure - Cachan (ENS Cachan), Dpt of Computer Engineering [Kocaeli], Gebze Teknik Üniversitesi [Gebze], Tel-Hai College, Algorithmes, Graphes et Combinatoire (ALGCO), Laboratoire d'Informatique de Robotique et de Microélectronique de Montpellier (LIRMM), Centre National de la Recherche Scientifique (CNRS)-Université de Montpellier (UM)-Centre National de la Recherche Scientifique (CNRS)-Université de Montpellier (UM), ANR-16-CE40-0028,DE-MO-GRAPH,Décomposition de Modèles Graphiques(2016), ANR-17-CE23-0010,ESIGMA,Efficacité et structure pour les applications de la fouille de graphes(2017), Operational Research, Knowledge And Data (ORKAD), Centre de Recherche en Informatique, Signal et Automatique de Lille - UMR 9189 (CRIStAL), Centrale Lille-Université de Lille-Centre National de la Recherche Scientifique (CNRS)-Centrale Lille-Université de Lille-Centre National de la Recherche Scientifique (CNRS), Gebze Technical University, Holon Institut of Technology (HIT), and Université de Montpellier (UM)-Centre National de la Recherche Scientifique (CNRS)-Université de Montpellier (UM)-Centre National de la Recherche Scientifique (CNRS)

Subjects

FOS: Computer and information sciences, 05C85, 68R10, Computer science, Total cost, [INFO.INFO-DS]Computer Science [cs]/Data Structures and Algorithms [cs.DS], 0211 other engineering and technologies, Parameterized complexity, G.2.1, G.2.2, 0102 computer and information sciences, 02 engineering and technology, Computational Complexity (cs.CC), [INFO.INFO-DM]Computer Science [cs]/Discrete Mathematics [cs.DM], 01 natural sciences, Theoretical Computer Science, Combinatorics, symbols.namesake, Computer Science - Data Structures and Algorithms, 0202 electrical engineering, electronic engineering, information engineering, Data Structures and Algorithms (cs.DS), 021103 operations research, Spanning tree, Degree (graph theory), 020206 networking & telecommunications, Vertex (geometry), Planar graph, Computer Science - Computational Complexity, Edge coloring, Graph factors, Computational Theory and Mathematics, 010201 computation theory & mathematics, Bounded function, Path (graph theory), symbols, Reload costs, MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

International audience; The concept of Reload cost in a graph refers to the cost that occurs while traversing a vertex via two of its incident edges. This cost is uniquely determined by the colors of the two edges. This concept has various applications in transportation networks, communication networks, and energy distribution networks. Various problems using this model are defined and studied in the literature. The problem of finding a spanning tree whose diameter with respect to the reload costs is the smallest possible, the problems of finding a path, trail or walk with minimum total reload cost between two given vertices, problems about finding a proper edge coloring of a graph such that the total reload cost is minimized, the problem of finding a spanning tree such that the sum of the reload costs of all paths between all pairs of vertices is minimized, and the problem of finding a set of cycles of minimum reload cost, that cover all the vertices of a graph, are examples of such problems. In this work we focus on the last problem. Noting that a cycle cover of a graph is a 2-factor of it, we generalize the problem to that of finding an r -factor of minimum reload cost of an edge colored graph. We prove several $NP$-hardness results for special cases of the problem. Namely, bounded degree graphs, planar graphs, bounded total cost, and bounded number of distinct costs. For the special case of r =2 , our results imply an improved $NP$-hardness result. On the positive side, we present a polynomial-time solvable special case which provides a tight boundary between the polynomial and hard cases in terms of r and the maximum degree of the graph. We then investigate the parameterized complexity of the problem, prove W[1]-hardness results and present an FPT-algorithm.

Published

2019

16. Approximability of Connected Factors

Author

Cornelissen, Kamiel, Hoeksma, R.P., Manthey, Bodo, Narayanaswamy, N.S., Rahul, C.S., Kaklamanis, C., Pruhs, K., and Discrete Mathematics and Mathematical Programming

Subjects

Discrete mathematics, Connected component, EWI-24832, Matching (graph theory), Complete graph, Approximation algorithm, Directed graph, Travelling salesman problem, Approximation algorithms, IR-91426, METIS-305910, Combinatorics, Graph factors, Graph (abstract data type), Graph factorization, Mathematics

Abstract

Finding a d-regular spanning subgraph (or d-factor) of a graph is easy by Tutte’s reduction to the matching problem. By the same reduction, it is easy to find a minimal or maximal d-factor of a graph. However, if we require that the d-factor is connected, these problems become NP-hard – finding a minimal connected 2-factor is just the traveling salesman problem (TSP). Given a complete graph with edge weights that satisfy the triangle inequality, we consider the problem of finding a minimal connected d-factor. We give a 3-approximation for all d and improve this to an (r + 1)-approximation for even d, where r is the approximation ratio of the TSP. This yields a 2.5-approximation for even d. The same algorithm yields an (r + 1)-approximation for the directed version of the problem, where r is the approximation ratio of the asymmetric TSP. We also show that none of these minimization problems can be approximated better than the corresponding TSP. Finally, for the decision problem of deciding whether a given graph contains a connected d-factor, we extend known hardness results.

Published

2014

17. Partitioning Perfect Graphs into Stars

Author

van Bevern, René, Bredereck, Robert, Bulteau, Laurent, Chen, Jiehua, Froese, Vincent, Niedermeier, Rolf, Woeginger, Gerhard J., Discrete Mathematics, Department of Software Engineering and Theoretical Computer Science (SWT - TUB), Technische Universität Berlin (TU), Laboratoire d'Informatique Gaspard-Monge (LIGM), Centre National de la Recherche Scientifique (CNRS)-Fédération de Recherche Bézout-ESIEE Paris-École des Ponts ParisTech (ENPC)-Université Paris-Est Marne-la-Vallée (UPEM), Northwestern Polytechnical University [Xi'an] (NPU), Department of mathematics and computing science [Eindhoven], Eindhoven University of Technology [Eindhoven] (TU/e), and Université Paris-Est Marne-la-Vallée (UPEM)-École des Ponts ParisTech (ENPC)-ESIEE Paris-Fédération de Recherche Bézout-Centre National de la Recherche Scientifique (CNRS)

Subjects

[INFO.INFO-CC]Computer Science [cs]/Computational Complexity [cs.CC], graph algorithms, FOS: Computer and information sciences, Discrete Mathematics (cs.DM), 05C70, [INFO.INFO-DS]Computer Science [cs]/Data Structures and Algorithms [cs.DS], P-Partition, G.2.1, G.2.2, I.1.2, graph factors, F.2.2, Computer Science - Data Structures and Algorithms, FOS: Mathematics, Mathematics - Combinatorics, generalized matching problem, Data Structures and Algorithms (cs.DS), Combinatorics (math.CO), [INFO.INFO-BI]Computer Science [cs]/Bioinformatics [q-bio.QM], graph packing, Computer Science - Discrete Mathematics, MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

The partition of graphs into "nice" subgraphs is a central algorithmic problem with strong ties to matching theory. We study the partitioning of undirected graphs into same-size stars, a problem known to be NP-complete even for the case of stars on three vertices. We perform a thorough computational complexity study of the problem on subclasses of perfect graphs and identify several polynomial-time solvable cases, for example, on interval graphs and bipartite permutation graphs, and also NP-complete cases, for example, on grid graphs and chordal graphs., Comment: Manuscript accepted to Journal of Graph Theory

Published

2014