Search

Your search keyword '"WALCZAK, BARTOSZ"' showing total 299 results
Start Over Author "WALCZAK, BARTOSZ"
299 results on '"WALCZAK, BARTOSZ"'

1. Polynomial-time recognition and maximum independent set in Burling graphs

Author

Rzążewski, Paweł and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

A Burling graph is an induced subgraph of some graph in Burling's construction of triangle-free high-chromatic graphs. We provide a polynomial-time algorithm which decides whether a given graph is a Burling graph and if it is, constructs its intersection model by rectangular frames. That model enables a polynomial-time algorithm for the maximum independent set problem in Burling graphs. As a consequence, we establish Burling graphs as the first known hereditary class of graphs that admits such an algorithm while not being $\chi$-bounded.

Published
2024

2. Excluding a clique or a biclique in graphs of bounded induced matching treewidth

Author

Abrishami, Tara, Briański, Marcin, Czyżewska, Jadwiga, McCarty, Rose, Milanič, Martin, Rzążewski, Paweł, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics
Abstract

For a tree decomposition $\mathcal{T}$ of a graph $G$, let $\mu(\mathcal{T})$ denote the maximum size of an induced matching in $G$ with the property that some bag of $\mathcal{T}$ contains at least one endpoint of every edge of the matching. The induced matching treewidth of a graph $G$ is the minimum value of $\mu(\mathcal{T})$ over all tree decompositions $\mathcal{T}$ of $G$. Classes of graphs with bounded induced matching treewidth admit polynomial-time algorithms for a number of problems, including INDEPENDENT SET, $k$-COLORING, ODD CYCLE TRANSVERSAL, and FEEDBACK VERTEX SET. In this paper, we focus on combinatorial properties of such classes. First, we show that graphs with bounded induced matching treewidth that exclude a fixed biclique as an induced subgraph have bounded tree-independence number, which is another well-studied parameter defined in terms of tree decompositions. This sufficient condition about excluding a biclique is also necessary, as bicliques have unbounded tree-independence number. Second, we show that graphs with bounded induced matching treewidth that exclude a fixed clique have bounded chromatic number, that is, classes of graphs with bounded induced matching treewidth are $\chi$-bounded. The two results confirm two conjectures due to Lima et al. [ESA 2024].

Published
2024

3. Separator Theorem and Algorithms for Planar Hyperbolic Graphs

Author

Kisfaludi-Bak, Sándor, Masaříková, Jana, van Leeuwen, Erik Jan, Walczak, Bartosz, and Węgrzycki, Karol

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics
Abstract

The hyperbolicity of a graph, informally, measures how close a graph is (metrically) to a tree. Hence, it is intuitively similar to treewidth, but the measures are formally incomparable. Motivated by the broad study of algorithms and separators on planar graphs and their relation to treewidth, we initiate the study of planar graphs of bounded hyperbolicity. Our main technical contribution is a novel balanced separator theorem for planar $\delta$-hyperbolic graphs that is substantially stronger than the classic planar separator theorem. For any fixed $\delta \geq 0$, we can find balanced separator that induces either a single geodesic (shortest) path or a single geodesic cycle in the graph. An important advantage of our separator is that the union of our separator (vertex set $Z$) with any subset of the connected components of $G - Z$ induces again a planar $\delta$-hyperbolic graph, which would not be guaranteed with an arbitrary separator. Our construction runs in near-linear time and guarantees that size of separator is $\mathrm{poly}(\delta) \cdot \log n$. As an application of our separator theorem and its strong properties, we obtain two novel approximation schemes on planar $\delta$-hyperbolic graphs. We prove that Maximum Independent Set and the Traveling Salesperson problem have a near-linear time FPTAS for any constant $\delta$, running in $n\, \mathrm{polylog}(n) \cdot 2^{\mathcal{O}(\delta^2)} \cdot \varepsilon^{-\mathcal{O}(\delta)}$ time. We also show that our approximation scheme for Maximum Independent Set has essentially the best possible running time under the Exponential Time Hypothesis (ETH). This immediately follows from our third contribution: we prove that Maximum Independent Set has no $n^{o(\delta)}$-time algorithm on planar $\delta$-hyperbolic graphs, unless ETH fails.

Published
2023

4. Cliquewidth and dimension

Author

Joret, Gwenaël, Micek, Piotr, Pilipczuk, Michał, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We prove that every poset with bounded cliquewidth and with sufficiently large dimension contains the standard example of dimension $k$ as a subposet. This applies in particular to posets whose cover graphs have bounded treewidth, as the cliquewidth of a poset is bounded in terms of the treewidth of the cover graph. For the latter posets, we prove a stronger statement: every such poset with sufficiently large dimension contains the Kelly example of dimension $k$ as a subposet. Using this result, we obtain a full characterization of the minor-closed graph classes $\mathcal{C}$ such that posets with cover graphs in $\mathcal{C}$ have bounded dimension: they are exactly the classes excluding the cover graph of some Kelly example. Finally, we consider a variant of poset dimension called Boolean dimension, and we prove that posets with bounded cliquewidth have bounded Boolean dimension. The proofs rely on Colcombet's deterministic version of Simon's factorization theorem, which is a fundamental tool in formal language and automata theory, and which we believe deserves a wider recognition in structural and algorithmic graph theory.

Published
2023

5. Tight bound on treedepth in terms of pathwidth and longest path

Author

Hatzel, Meike, Joret, Gwenaël, Micek, Piotr, Pilipczuk, Marcin, Ueckerdt, Torsten, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We show that every graph with pathwidth strictly less than $a$ that contains no path on $2^b$ vertices as a subgraph has treedepth at most $10ab$. The bound is best possible up to a constant factor., Comment: v3: corrected some typos. v2: revised following referees' comments, corrects an error in v1

Published
2023
Full Text
View/download PDF

8. A solution to Ringel's circle problem

Author

Davies, James, Keller, Chaya, Kleist, Linda, Smorodinsky, Shakhar, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We construct families of circles in the plane such that their tangency graphs have arbitrarily large girth and chromatic number. This provides a strong negative answer to Ringel's circle problem (1959). The proof relies on a (multidimensional) version of Gallai's theorem with polynomial constraints, which we derive from the Hales-Jewett theorem and which may be of independent interest., Comment: new section on an "induced" version of Gallai's theorem with constraints, minor other improvements

Published
2021

10. Grounded L-graphs are polynomially $\chi$-bounded

Author

Davies, James, Krawczyk, Tomasz, McCarty, Rose, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

A grounded L-graph is the intersection graph of a collection of "L" shapes whose topmost points belong to a common horizontal line. We prove that every grounded L-graph with clique number $\omega$ has chromatic number at most $17\omega^4$. This improves the doubly-exponential bound of McGuinness and generalizes the recent result that the class of circle graphs is polynomially $\chi$-bounded. We also survey $\chi$-boundedness problems for grounded geometric intersection graphs and give a high-level overview of recent techniques to obtain polynomial bounds.

Published
2021

11. Distinguishing classes of intersection graphs of homothets or similarities of two convex disks

Author

Abrahamsen, Mikkel and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C05
Abstract

For smooth convex disks $A$, i.e., convex compact subsets of the plane with non-empty interior, we classify the classes $G^{\text{hom}}(A)$ and $G^{\text{sim}}(A)$ of intersection graphs that can be obtained from homothets and similarities of $A$, respectively. Namely, we prove that $G^{\text{hom}}(A)=G^{\text{hom}}(B)$ if and only if $A$ and $B$ are affine equivalent, and $G^{\text{sim}}(A)=G^{\text{sim}}(B)$ if and only if $A$ and $B$ are similar.

Published
2021

12. Colouring polygon visibility graphs and their generalizations

Author

Davies, James, Krawczyk, Tomasz, McCarty, Rose, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, 05C15, 05C62, 52C30
Abstract

Curve pseudo-visibility graphs generalize polygon and pseudo-polygon visibility graphs and form a hereditary class of graphs. We prove that every curve pseudo-visibility graph with clique number $\omega$ has chromatic number at most $3\cdot 4^{\omega-1}$. The proof is carried through in the setting of ordered graphs; we identify two conditions satisfied by every curve pseudo-visibility graph (considered as an ordered graph) and prove that they are sufficient for the claimed bound. The proof is algorithmic: both the clique number and a colouring with the claimed number of colours can be computed in polynomial time.

Published
2021

14. Degeneracy of $P_t$-free and $C_{\geq t}$-free graphs with no large complete bipartite subgraphs

Author

Bonamy, Marthe, Bousquet, Nicolas, Pilipczuk, Michał, Rzążewski, Paweł, Thomassé, Stéphan, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics
Abstract

A hereditary class of graphs $\mathcal{G}$ is \emph{$\chi$-bounded} if there exists a function $f$ such that every graph $G \in \mathcal{G}$ satisfies $\chi(G) \leq f(\omega(G))$, where $\chi(G)$ and $\omega(G)$ are the chromatic number and the clique number of $G$, respectively. As one of the first results about $\chi$-bounded classes, Gy\'{a}rf\'{a}s proved in 1985 that if $G$ is $P_t$-free, i.e., does not contain a $t$-vertex path as an induced subgraph, then $\chi(G) \leq (t-1)^{\omega(G)-1}$. In 2017, Chudnovsky, Scott, and Seymour proved that $C_{\geq t}$-free graphs, i.e., graphs that exclude induced cycles with at least $t$ vertices, are $\chi$-bounded as well, and the obtained bound is again superpolynomial in the clique number. Note that $P_{t-1}$-free graphs are in particular $C_{\geq t}$-free. It remains a major open problem in the area whether for $C_{\geq t}$-free, or at least $P_t$-free graphs $G$, the value of $\chi(G)$ can be bounded from above by a polynomial function of $\omega(G)$. We consider a relaxation of this problem, where we compare the chromatic number with the size of a largest balanced biclique contained in the graph as a (not necessarily induced) subgraph. We show that for every $t$ there exists a constant $c$ such that for and every $C_{\geq t}$-free graph which does not contain $K_{\ell,\ell}$ as a subgraph, it holds that $\chi(G) \leq \ell^{c}$.

Published
2020

15. Approximating pathwidth for graphs of small treewidth

Author

Groenland, Carla, Joret, Gwenaël, Nadara, Wojciech, and Walczak, Bartosz

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Discrete Mathematics, Mathematics - Combinatorics
Abstract

We describe a polynomial-time algorithm which, given a graph $G$ with treewidth $t$, approximates the pathwidth of $G$ to within a ratio of $O(t\sqrt{\log t})$. This is the first algorithm to achieve an $f(t)$-approximation for some function $f$. Our approach builds on the following key insight: every graph with large pathwidth has large treewidth or contains a subdivision of a large complete binary tree. Specifically, we show that every graph with pathwidth at least $th+2$ has treewidth at least $t$ or contains a subdivision of a complete binary tree of height $h+1$. The bound $th+2$ is best possible up to a multiplicative constant. This result was motivated by, and implies (with $c=2$), the following conjecture of Kawarabayashi and Rossman (SODA'18): there exists a universal constant $c$ such that every graph with pathwidth $\Omega(k^c)$ has treewidth at least $k$ or contains a subdivision of a complete binary tree of height $k$. Our main technical algorithm takes a graph $G$ and some (not necessarily optimal) tree decomposition of $G$ of width $t'$ in the input, and it computes in polynomial time an integer $h$, a certificate that $G$ has pathwidth at least $h$, and a path decomposition of $G$ of width at most $(t'+1)h+1$. The certificate is closely related to (and implies) the existence of a subdivision of a complete binary tree of height $h$. The approximation algorithm for pathwidth is then obtained by combining this algorithm with the approximation algorithm of Feige, Hajiaghayi, and Lee (STOC'05) for treewidth., Comment: v4: small changes following further comments from a referee. v3: revised following referees' comments, corrects a serious error in the previous version

Published
2020
Full Text
View/download PDF

16. Coloring and Maximum Weight Independent Set of Rectangles

Author

Chalermsook, Parinya and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, Mathematics - Combinatorics
Abstract

In 1960, Asplund and Gr\"unbaum proved that every intersection graph of axis-parallel rectangles in the plane admits an $O(\omega^2)$-coloring, where $\omega$ is the maximum size of a clique. We present the first asymptotic improvement over this six-decade-old bound, proving that every such graph is $O(\omega\log\omega)$-colorable and presenting a polynomial-time algorithm that finds such a coloring. This improvement leads to a polynomial-time $O(\log\log n)$-approximation algorithm for the maximum weight independent set problem in axis-parallel rectangles, which improves on the previous approximation ratio of $O(\frac{\log n}{\log\log n})$.

Published
2020

17. Clustered 3-Colouring Graphs of Bounded Degree

Author

Dujmović, Vida, Esperet, Louis, Morin, Pat, Walczak, Bartosz, and Wood, David R.

Subjects
Mathematics - Combinatorics
Abstract

A (not necessarily proper) vertex colouring of a graph has "clustering" $c$ if every monochromatic component has at most $c$ vertices. We prove that planar graphs with maximum degree $\Delta$ are 3-colourable with clustering $O(\Delta^2)$. The previous best bound was $O(\Delta^{37})$. This result for planar graphs generalises to graphs that can be drawn on a surface of bounded Euler genus with a bounded number of crossings per edge. We then prove that graphs with maximum degree $\Delta$ that exclude a fixed minor are 3-colourable with clustering $O(\Delta^5)$. The best previous bound for this result was exponential in $\Delta$., Comment: arXiv admin note: text overlap with arXiv:1904.04791

Published
2020
Full Text
View/download PDF

18. Coloring triangle-free L-graphs with $O(\log\log n)$ colors

Author

Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

It is proved that triangle-free intersection graphs of $n$ L-shapes in the plane have chromatic number $O(\log\log n)$. This improves the previous bound of $O(\log n)$ (McGuinness, 1996) and matches the known lower bound construction (Pawlik et al., 2013).

Published
2020

19. Subexponential-time algorithms for finding large induced sparse subgraphs

Author

Novotná, Jana, Okrasa, Karolina, Pilipczuk, Michał, Rzążewski, Paweł, van Leeuwen, Erik Jan, and Walczak, Bartosz

Subjects
Computer Science - Computational Complexity
Abstract

Let $\mathcal{C}$ and $\mathcal{D}$ be hereditary graph classes. Consider the following problem: given a graph $G\in\mathcal{D}$, find a largest, in terms of the number of vertices, induced subgraph of $G$ that belongs to $\mathcal{C}$. We prove that it can be solved in $2^{o(n)}$ time, where $n$ is the number of vertices of $G$, if the following conditions are satisfied: * the graphs in $\mathcal{C}$ are sparse, i.e., they have linearly many edges in terms of the number of vertices; * the graphs in $\mathcal{D}$ admit balanced separators of size governed by their density, e.g., $\mathcal{O}(\Delta)$ or $\mathcal{O}(\sqrt{m})$, where $\Delta$ and $m$ denote the maximum degree and the number of edges, respectively; and * the considered problem admits a single-exponential fixed-parameter algorithm when parameterized by the treewidth of the input graph. This leads, for example, to the following corollaries for specific classes $\mathcal{C}$ and $\mathcal{D}$: * a largest induced forest in a $P_t$-free graph can be found in $2^{\tilde{\mathcal{O}}(n^{2/3})}$ time, for every fixed $t$; and * a largest induced planar graph in a string graph can be found in $2^{\tilde{\mathcal{O}}(n^{3/4})}$ time., Comment: Appeared on IPEC 2019

Published
2019

20. Planar graphs have bounded nonrepetitive chromatic number

Author

Dujmović, Vida, Esperet, Louis, Joret, Gwenaël, Walczak, Bartosz, and Wood, David R.

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

A colouring of a graph is "nonrepetitive" if for every path of even order, the sequence of colours on the first half of the path is different from the sequence of colours on the second half. We show that planar graphs have nonrepetitive colourings with a bounded number of colours, thus proving a conjecture of Alon, Grytczuk, Haluszczak and Riordan (2002). We also generalise this result for graphs of bounded Euler genus, graphs excluding a fixed minor, and graphs excluding a fixed topological minor.

Published
2019
Full Text
View/download PDF

23. Sparse Kneser graphs are Hamiltonian

Author

Mütze, Torsten, Nummenpalo, Jerri, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 05C45, 94B25
Abstract

For integers $k\geq 1$ and $n\geq 2k+1$, the Kneser graph $K(n,k)$ is the graph whose vertices are the $k$-element subsets of $\{1,\ldots,n\}$ and whose edges connect pairs of subsets that are disjoint. The Kneser graphs of the form $K(2k+1,k)$ are also known as the odd graphs. We settle an old problem due to Meredith, Lloyd, and Biggs from the 1970s, proving that for every $k\geq 3$, the odd graph $K(2k+1,k)$ has a Hamilton cycle. This and a known conditional result due to Johnson imply that all Kneser graphs of the form $K(2k+2^a,k)$ with $k\geq 3$ and $a\geq 0$ have a Hamilton cycle. We also prove that $K(2k+1,k)$ has at least $2^{2^{k-6}}$ distinct Hamilton cycles for $k\geq 6$. Our proofs are based on a reduction of the Hamiltonicity problem in the odd graph to the problem of finding a spanning tree in a suitably defined hypergraph on Dyck words.

Published
2017
Full Text
View/download PDF

24. Boolean dimension and local dimension

Author

Trotter, William T. and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 06A07
Abstract

Dimension is a standard and well-studied measure of complexity of posets. Recent research has provided many new upper bounds on the dimension for various structurally restricted classes of posets. Bounded dimension gives a succinct representation of the poset, admitting constant response time for queries of the form "is $x

Published
2017

26. Dimension of posets with planar cover graphs excluding two long incomparable chains

Author

Howard, David M., Streib, Noah, Trotter, William T., Walczak, Bartosz, and Wang, Ruidong

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 06A07, 05C35
Abstract

It has been known for more than 40 years that there are posets with planar cover graphs and arbitrarily large dimension. Recently, Streib and Trotter proved that such posets must have large height. In fact, all known constructions of such posets have two large disjoint chains with all points in one chain incomparable with all points in the other. Gutowski and Krawczyk conjectured that this feature is necessary. More formally, they conjectured that for every $k\geq 1$, there is a constant $d$ such that if $P$ is a poset with a planar cover graph and $P$ excludes $\mathbf{k}+\mathbf{k}$, then $\dim(P)\leq d$. We settle their conjecture in the affirmative. We also discuss possibilities of generalizing the result by relaxing the condition that the cover graph is planar., Comment: New section on connections with graph minors, small corrections

Published
2016
Full Text
View/download PDF

27. Common tangents of two disjoint polygons in linear time and constant workspace

Author

Abrahamsen, Mikkel and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, 68U05, 65D18, I.3.5
Abstract

We provide a remarkably simple algorithm to compute all (at most four) common tangents of two disjoint simple polygons. Given each polygon as a read-only array of its corners in cyclic order, the algorithm runs in linear time and constant workspace and is the first to achieve the two complexity bounds simultaneously. The set of common tangents provides basic information about the convex hulls of the polygons---whether they are nested, overlapping, or disjoint---and our algorithm thus also decides this relationship., Comment: Final published version, merged with arXiv:1511.04036

Published
2016
Full Text
View/download PDF

28. Coloring curves that cross a fixed curve

Author

Rok, Alexandre and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

We prove that for every integer $t\geq 1$, the class of intersection graphs of curves in the plane each of which crosses a fixed curve in at least one and at most $t$ points is $\chi$-bounded. This is essentially the strongest $\chi$-boundedness result one can get for this kind of graph classes. As a corollary, we prove that for any fixed integers $k\geq 2$ and $t\geq 1$, every $k$-quasi-planar topological graph on $n$ vertices with any two edges crossing at most $t$ times has $O(n\log n)$ edges., Comment: Small corrections, improved presentation

Published
2015

29. Graph drawings with one bend and few slopes

Author

Knauer, Kolja and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics, 05C62, 68R10
Abstract

We consider drawings of graphs in the plane in which edges are represented by polygonal paths with at most one bend and the number of different slopes used by all segments of these paths is small. We prove that $\lceil\frac{\Delta}{2}\rceil$ edge slopes suffice for outerplanar drawings of outerplanar graphs with maximum degree $\Delta\geq 3$. This matches the obvious lower bound. We also show that $\lceil\frac{\Delta}{2}\rceil+1$ edge slopes suffice for drawings of general graphs, improving on the previous bound of $\Delta+1$. Furthermore, we improve previous upper bounds on the number of slopes needed for planar drawings of planar and bipartite planar graphs., Comment: minor revision. arXiv admin note: text overlap with arXiv:1205.2548

Published
2015

30. Dimension and cut vertices: an application of Ramsey theory

Author

Trotter, William T., Walczak, Bartosz, and Wang, Ruidong

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 06A07, 05C35
Abstract

Motivated by quite recent research involving the relationship between the dimension of a poset and graph-theoretic properties of its cover graph, we show that for every $d\geq 1$, if $P$ is a poset and the dimension of a subposet $B$ of $P$ is at most $d$ whenever the cover graph of $B$ is a block of the cover graph of $P$, then the dimension of $P$ is at most $d+2$. We also construct examples which show that this inequality is best possible. We consider the proof of the upper bound to be fairly elegant and relatively compact. However, we know of no simple proof for the lower bound, and our argument requires a powerful tool known as the Product Ramsey Theorem. As a consequence, our constructions involve posets of enormous size., Comment: Final published version with updated references

Published
2015
Full Text
View/download PDF

31. Asymmetric coloring games on incomparability graphs

Author

Krawczyk, Tomasz and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

Consider the following game on a graph $G$: Alice and Bob take turns coloring the vertices of $G$ properly from a fixed set of colors; Alice wins when the entire graph has been colored, while Bob wins when some uncolored vertices have been left. The game chromatic number of $G$ is the minimum number of colors that allows Alice to win the game. The game Grundy number of $G$ is defined similarly except that the players color the vertices according to the first-fit rule and they only decide on the order in which it is applied. The $(a,b)$-game chromatic and Grundy numbers are defined likewise except that Alice colors $a$ vertices and Bob colors $b$ vertices in each round. We study the behavior of these parameters for incomparability graphs of posets with bounded width. We conjecture a complete characterization of the pairs $(a,b)$ for which the $(a,b)$-game chromatic and Grundy numbers are bounded in terms of the width of the poset; we prove that it gives a necessary condition and provide some evidence for its sufficiency. We also show that the game chromatic number is not bounded in terms of the Grundy number, which answers a question of Havet and Zhu.

Published
2015

33. On the Beer index of convexity and its variants

Author

Balko, Martin, Jelínek, Vít, Valtr, Pavel, and Walczak, Bartosz

Subjects
Mathematics - Metric Geometry, Computer Science - Computational Geometry, Mathematics - Combinatorics, 52A27
Abstract

Let $S$ be a subset of $\mathbb{R}^d$ with finite positive Lebesgue measure. The Beer index of convexity $\operatorname{b}(S)$ of $S$ is the probability that two points of $S$ chosen uniformly independently at random see each other in $S$. The convexity ratio $\operatorname{c}(S)$ of $S$ is the Lebesgue measure of the largest convex subset of $S$ divided by the Lebesgue measure of $S$. We investigate the relationship between these two natural measures of convexity. We show that every set $S\subseteq\mathbb{R}^2$ with simply connected components satisfies $\operatorname{b}(S)\leq\alpha\operatorname{c}(S)$ for an absolute constant $\alpha$, provided $\operatorname{b}(S)$ is defined. This implies an affirmative answer to the conjecture of Cabello et al. that this estimate holds for simple polygons. We also consider higher-order generalizations of $\operatorname{b}(S)$. For $1\leq k\leq d$, the $k$-index of convexity $\operatorname{b}_k(S)$ of a set $S\subseteq\mathbb{R}^d$ is the probability that the convex hull of a $(k+1)$-tuple of points chosen uniformly independently at random from $S$ is contained in $S$. We show that for every $d\geq 2$ there is a constant $\beta(d)>0$ such that every set $S\subseteq\mathbb{R}^d$ satisfies $\operatorname{b}_d(S)\leq\beta\operatorname{c}(S)$, provided $\operatorname{b}_d(S)$ exists. We provide an almost matching lower bound by showing that there is a constant $\gamma(d)>0$ such that for every $\varepsilon\in(0,1)$ there is a set $S\subseteq\mathbb{R}^d$ of Lebesgue measure $1$ satisfying $\operatorname{c}(S)\leq\varepsilon$ and $\operatorname{b}_d(S)\geq\gamma\frac{\varepsilon}{\log_2{1/\varepsilon}}\geq\gamma\frac{\operatorname{c}(S)}{\log_2{1/\operatorname{c}(S)}}$., Comment: Final version, minor revision

Published
2014
Full Text
View/download PDF

34. Graph sharing game and the structure of weighted graphs with a forbidden subdivision

Author

Gągol, Adam, Micek, Piotr, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 05C57, 05C83
Abstract

In the graph sharing game, two players share a connected graph $G$ with non-negative weights assigned to the vertices, claiming and collecting the vertices of $G$ one by one, while keeping the set of all claimed vertices connected through the whole game. Each player wants to maximize the total weight of the vertices they have gathered by the end of the game, when the whole $G$ has been claimed. It is proved that for any class $\mathcal{G}$ of graphs with an odd number of vertices and with forbidden subdivision of a fixed graph (e.g., for the class $\mathcal{G}$ of planar graphs with an odd number of vertices), there is a constant $c_{\mathcal{G}}>0$ such that the first player can secure at least the $c_{\mathcal{G}}$ proportion of the total weight of $G$ whenever $G\in\mathcal{G}$. Known examples show that such a constant does no longer exist if any of the two conditions on the class $\mathcal{G}$ (an odd number of vertices or a forbidden subdivision) is removed. The main ingredient in the proof is a new structural result on weighted graphs with a forbidden subdivision., Comment: Final journal version

Published
2014
Full Text
View/download PDF

35. Minors and dimension

Author

Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 06A07, 05C35
Abstract

It has been known for 30 years that posets with bounded height and with cover graphs of bounded maximum degree have bounded dimension. Recently, Streib and Trotter proved that dimension is bounded for posets with bounded height and planar cover graphs, and Joret et al. proved that dimension is bounded for posets with bounded height and with cover graphs of bounded tree-width. In this paper, it is proved that posets of bounded height whose cover graphs exclude a fixed topological minor have bounded dimension. This generalizes all the aforementioned results and verifies a conjecture of Joret et al. The proof relies on the Robertson-Seymour and Grohe-Marx graph structure theorems., Comment: Updated references

Published
2014
Full Text
View/download PDF

36. Triangle-free geometric intersection graphs with no large independent sets

Author

Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Metric Geometry, 05C62, 05C15
Abstract

It is proved that there are triangle-free intersection graphs of line segments in the plane with arbitrarily small ratio between the maximum size of an independent set and the total number of vertices., Comment: Change of the title, minor revision

Published
2014
Full Text
View/download PDF

37. On-line approach to off-line coloring problems on graphs with geometric representations

Author

Krawczyk, Tomasz and Walczak, Bartosz

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics, 05C15, 05C62, 68W27
Abstract

The main goal of this paper is to formalize and explore a connection between chromatic properties of graphs with geometric representations and competitive analysis of on-line algorithms, which became apparent after the recent construction of triangle-free geometric intersection graphs with arbitrarily large chromatic number due to Pawlik et al. We show that on-line graph coloring problems give rise to classes of game graphs with a natural geometric interpretation. We use this concept to estimate the chromatic number of graphs with geometric representations by finding, for appropriate simpler graphs, on-line coloring algorithms using few colors or proving that no such algorithms exist. We derive upper and lower bounds on the maximum chromatic number that rectangle overlap graphs, subtree overlap graphs, and interval filament graphs (all of which generalize interval overlap graphs) can have when their clique number is bounded. The bounds are absolute for interval filament graphs and asymptotic of the form $(\log\log n)^{f(\omega)}$ for rectangle and subtree overlap graphs, where $f(\omega)$ is a polynomial function of the clique number and $n$ is the number of vertices. In particular, we provide the first construction of geometric intersection graphs with bounded clique number and with chromatic number asymptotically greater than $\log\log n$. We also introduce a concept of $K_k$-free colorings and show that for some geometric representations, $K_3$-free chromatic number can be bounded in terms of clique number although the ordinary ($K_2$-free) chromatic number cannot. Such a result for segment intersection graphs would imply a well-known conjecture that $k$-quasi-planar geometric graphs have linearly many edges., Comment: Final version, minor revision

Published
2014
Full Text
View/download PDF

38. Decomposition of multiple packings with subquadratic union complexity

Author

Pach, János and Walczak, Bartosz

Subjects
Mathematics - Metric Geometry, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics, 52C15, 05B40
Abstract

Suppose $k$ is a positive integer and $\mathcal{X}$ is a $k$-fold packing of the plane by infinitely many arc-connected compact sets, which means that every point of the plane belongs to at most $k$ sets. Suppose there is a function $f(n)=o(n^2)$ with the property that any $n$ members of $\mathcal{X}$ determine at most $f(n)$ holes, which means that the complement of their union has at most $f(n)$ bounded connected components. We use tools from extremal graph theory and the topological Helly theorem to prove that $\mathcal{X}$ can be decomposed into at most $p$ ($1$-fold) packings, where $p$ is a constant depending only on $k$ and $f$., Comment: Small generalization of the main result, improvements in the proofs, minor corrections

Published
2013
Full Text
View/download PDF

39. Outerstring graphs are $\chi$-bounded

Author

Rok, Alexandre and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

An outerstring graph is an intersection graph of curves that lie in a common half-plane and have one endpoint on the boundary of that half-plane. We prove that the class of outerstring graphs is $\chi$-bounded, which means that their chromatic number is bounded by a function of their clique number. This generalizes a series of previous results on $\chi$-boundedness of outerstring graphs with various additional restrictions on the shape of curves or the number of times the pairs of curves can cross. The assumption that each curve has an endpoint on the boundary of the half-plane is justified by the known fact that triangle-free intersection graphs of straight-line segments can have arbitrarily large chromatic number., Comment: Introduction extended by a survey of results on (outer)string graphs, some minor corrections

Published
2013

40. Coloring intersection graphs of arc-connected sets in the plane

Author

Lasoń, Michał, Micek, Piotr, Pawlik, Arkadiusz, and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

A family of sets in the plane is simple if the intersection of its any subfamily is arc-connected, and it is pierced by a line $L$ if the intersection of its any member with $L$ is a nonempty segment. It is proved that the intersection graphs of simple families of compact arc-connected sets in the plane pierced by a common line have chromatic number bounded by a function of their clique number., Comment: Minor changes + some additional references not included in the journal version

Published
2013
Full Text
View/download PDF

41. New bounds on the maximum number of edges in $k$-quasi-planar graphs

Author

Suk, Andrew and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, 05C35, 05C62
Abstract

A topological graph is $k$-quasi-planar if it does not contain $k$ pairwise crossing edges. A 20-year-old conjecture asserts that for every fixed $k$, the maximum number of edges in a $k$-quasi-planar graph on $n$ vertices is $O(n)$. Fox and Pach showed that every $k$-quasi-planar graph with $n$ vertices has at most $n(\log n)^{O(\log k)}$ edges. We improve this upper bound to $2^{\alpha(n)^c}n\log n$, where $\alpha(n)$ denotes the inverse Ackermann function and $c$ depends only on $k$, for $k$-quasi-planar graphs in which any two edges intersect in a bounded number of points. We also show that every $k$-quasi-planar graph with $n$ vertices in which any two edges have at most one point in common has at most $O(n\log n)$ edges. This improves the previously known upper bound of $2^{\alpha(n)^c}n\log n$ obtained by Fox, Pach, and Suk., Comment: Final version, minor corrections

Published
2013
Full Text
View/download PDF

42. Tree-width and dimension

Author

Joret, Gwenaël, Micek, Piotr, Milans, Kevin G., Trotter, William T., Walczak, Bartosz, and Wang, Ruidong

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 06A07, 05C35
Abstract

Over the last 30 years, researchers have investigated connections between dimension for posets and planarity for graphs. Here we extend this line of research to the structural graph theory parameter tree-width by proving that the dimension of a finite poset is bounded in terms of its height and the tree-width of its cover graph., Comment: Updates on solutions of problems and on bibliography

Published
2013
Full Text
View/download PDF

43. Coloring triangle-free rectangle overlap graphs with $O(\log\log n)$ colors

Author

Krawczyk, Tomasz, Pawlik, Arkadiusz, and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics, 05C62, 05C15
Abstract

Recently, it was proved that triangle-free intersection graphs of $n$ line segments in the plane can have chromatic number as large as $\Theta(\log\log n)$. Essentially the same construction produces $\Theta(\log\log n)$-chromatic triangle-free intersection graphs of a variety of other geometric shapes---those belonging to any class of compact arc-connected sets in $\mathbb{R}^2$ closed under horizontal scaling, vertical scaling, and translation, except for axis-parallel rectangles. We show that this construction is asymptotically optimal for intersection graphs of boundaries of axis-parallel rectangles, which can be alternatively described as overlap graphs of axis-parallel rectangles. That is, we prove that triangle-free rectangle overlap graphs have chromatic number $O(\log\log n)$, improving on the previous bound of $O(\log n)$. To this end, we exploit a relationship between off-line coloring of rectangle overlap graphs and on-line coloring of interval overlap graphs. Our coloring method decomposes the graph into a bounded number of subgraphs with a tree-like structure that "encodes" strategies of the adversary in the on-line coloring problem. Then, these subgraphs are colored with $O(\log\log n)$ colors using a combination of techniques from on-line algorithms (first-fit) and data structure design (heavy-light decomposition)., Comment: Minor revision

Published
2013
Full Text
View/download PDF

44. Triangle-free geometric intersection graphs with large chromatic number

Author

Pawlik, Arkadiusz, Kozik, Jakub, Krawczyk, Tomasz, Lasoń, Michał, Micek, Piotr, Trotter, William T., and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

Several classical constructions illustrate the fact that the chromatic number of a graph can be arbitrarily large compared to its clique number. However, until very recently, no such construction was known for intersection graphs of geometric objects in the plane. We provide a general construction that for any arc-connected compact set $X$ in $\mathbb{R}^2$ that is not an axis-aligned rectangle and for any positive integer $k$ produces a family $\mathcal{F}$ of sets, each obtained by an independent horizontal and vertical scaling and translation of $X$, such that no three sets in $\mathcal{F}$ pairwise intersect and $\chi(\mathcal{F})>k$. This provides a negative answer to a question of Gyarfas and Lehel for L-shapes. With extra conditions, we also show how to construct a triangle-free family of homothetic (uniformly scaled) copies of a set with arbitrarily large chromatic number. This applies to many common shapes, like circles, square boundaries, and equilateral L-shapes. Additionally, we reveal a surprising connection between coloring geometric objects in the plane and on-line coloring of intervals on the line., Comment: Small corrections, bibliography update

Published
2012
Full Text
View/download PDF

45. Triangle-free intersection graphs of line segments with large chromatic number

Author

Pawlik, Arkadiusz, Kozik, Jakub, Krawczyk, Tomasz, Lasoń, Michał, Micek, Piotr, Trotter, William T., and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, 05C62, 05C15
Abstract

In the 1970s, Erdos asked whether the chromatic number of intersection graphs of line segments in the plane is bounded by a function of their clique number. We show the answer is no. Specifically, for each positive integer $k$, we construct a triangle-free family of line segments in the plane with chromatic number greater than $k$. Our construction disproves a conjecture of Scott that graphs excluding induced subdivisions of any fixed graph have chromatic number bounded by a function of their clique number., Comment: Small corrections, bibliography update

Published
2012
Full Text
View/download PDF

46. Outerplanar graph drawings with few slopes

Author

Knauer, Kolja, Micek, Piotr, and Walczak, Bartosz

Subjects
Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics, 05C62, 68R10
Abstract

We consider straight-line outerplanar drawings of outerplanar graphs in which a small number of distinct edge slopes are used, that is, the segments representing edges are parallel to a small number of directions. We prove that $\Delta-1$ edge slopes suffice for every outerplanar graph with maximum degree $\Delta\ge 4$. This improves on the previous bound of $O(\Delta^5)$, which was shown for planar partial 3-trees, a superclass of outerplanar graphs. The bound is tight: for every $\Delta\ge 4$ there is an outerplanar graph with maximum degree $\Delta$ that requires at least $\Delta-1$ distinct edge slopes in an outerplanar straight-line drawing., Comment: Major revision of the whole paper

Published
2012
Full Text
View/download PDF

47. An extremal problem on crossing vectors

Author

Lasoń, Michał, Micek, Piotr, Streib, Noah, Trotter, William T., and Walczak, Bartosz

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 05D05, 06A07
Abstract

For positive integers $w$ and $k$, two vectors $A$ and $B$ from $\mathbb{Z}^w$ are called $k$-crossing if there are two coordinates $i$ and $j$ such that $A[i]-B[i]\geq k$ and $B[j]-A[j]\geq k$. What is the maximum size of a family of pairwise $1$-crossing and pairwise non-$k$-crossing vectors in $\mathbb{Z}^w$? We state a conjecture that the answer is $k^{w-1}$. We prove the conjecture for $w\leq 3$ and provide weaker upper bounds for $w\geq 4$. Also, for all $k$ and $w$, we construct several quite different examples of families of desired size $k^{w-1}$. This research is motivated by a natural question concerning the width of the lattice of maximum antichains of a partially ordered set., Comment: Corrections and improvements

Published
2012
Full Text
View/download PDF

48. Extending partial representations of function graphs and permutation graphs

Author

Klavík, Pavel, Kratochvíl, Jan, Krawczyk, Tomasz, and Walczak, Bartosz

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Discrete Mathematics, Mathematics - Combinatorics
Abstract

Function graphs are graphs representable by intersections of continuous real-valued functions on the interval [0,1] and are known to be exactly the complements of comparability graphs. As such they are recognizable in polynomial time. Function graphs generalize permutation graphs, which arise when all functions considered are linear. We focus on the problem of extending partial representations, which generalizes the recognition problem. We observe that for permutation graphs an easy extension of Golumbic's comparability graph recognition algorithm can be exploited. This approach fails for function graphs. Nevertheless, we present a polynomial-time algorithm for extending a partial representation of a graph by functions defined on the entire interval [0,1] provided for some of the vertices. On the other hand, we show that if a partial representation consists of functions defined on subintervals of [0,1], then the problem of extending this representation to functions on the entire interval [0,1] becomes NP-complete., Comment: Submitted to ESA 2012, track A

Published
2012

49. An operational windmill in an open-air museum as a conservation challenge: Lessons from projects recently implemented in Poland.

Author

Tomaszewski, Filip and Walczak, Bartosz M.

Subjects
ELECTRIC drives, WIND power, LANDSCAPE changes, WINDMILLS, MOTOR vehicle driving
Abstract

The article discusses the methods of protecting historic windmills and recognising them as valuable objects of industrial heritage. Therefore, examples of attempts to restore windmills as working mills after 2010 are discussed. Translocation combined with comprehensive renovation can be an effective and desirable method of conservation for historic windmills with a wooden structure, as it enables the restitution of these facilities as operating mills. However, one should be aware of the risks associated with this type of activity: primarily the risk of losing the historic, original substance of the mill and changing its landscape context. An important problem is the safety of the dynamic exhibition and the lack of professionals - millers specialised in the field of drive mills, who would be able to not only set up the technological process but also maintain the machines included in it on an ongoing basis. The following part of the article discusses 12 examples of attempts to restart historic windmills. These examples are divided into two categories of objects: windmills with an alternative, modern electric drive; windmills with the ability to work using only wind power. The analysed examples of windmill conservation and reactivation provide the basis for formulating lessons for future projects in Poland and abroad. [ABSTRACT FROM AUTHOR]

Published
2024
Full Text
View/download PDF

50. Powojenne zniszczenia architektoniczne jako żywa pamięć i symbol jedności - studium przypadku Vukovaru w Chorwacji.

Author

NEVESCANIN, ANTONIO and WALCZAK, BARTOSZ M.

Subjects
CROATS, WATER towers, WATER distribution, WATER supply
Abstract

Copyright of Housing Environment / Środowisko Mieszkaniowe is the property of Chair of Housing Environment, Faculty of Architecture, Cracow University of Technology and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published
2024
Full Text
View/download PDF

Catalog

Books, media, physical & digital resources
See catalog results