Your search keyword '"Aichholzer, Oswin"' showing total 685 results

1. Separable Drawings: Extendability and Crossing-Free Hamiltonian Cycles

Author

Aichholzer, Oswin, Orthaber, Joachim, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry, Computer Science - Discrete Mathematics, Mathematics - Combinatorics

Abstract

Generalizing pseudospherical drawings, we introduce a new class of simple drawings, which we call separable drawings. In a separable drawing, every edge can be closed to a simple curve that intersects each other edge at most once. Curves of different edges might interact arbitrarily. Most notably, we show that (1) every separable drawing of any graph on $n$ vertices in the plane can be extended to a simple drawing of the complete graph $K_{n}$, (2) every separable drawing of $K_{n}$ contains a crossing-free Hamiltonian cycle and is plane Hamiltonian connected, and (3) every generalized convex drawing and every 2-page book drawing is separable. Further, the class of separable drawings is a proper superclass of the union of generalized convex and 2-page book drawings. Hence, our results on plane Hamiltonicity extend recent work on generalized convex drawings by Bergold et al. (SoCG 2024)., Comment: Preliminary full version of a paper appearing in the proceedings of GD 2024

Published

2024

2. Flips in Odd Matchings

Author

Aichholzer, Oswin, Brötzner, Anna, Perz, Daniel, and Schnider, Patrick

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

Let $\mathcal{P}$ be a set of $n=2m+1$ points in the plane in general position. We define the graph $GM_\mathcal{P}$ whose vertex set is the set of all plane matchings on $\mathcal{P}$ with exactly $m$ edges. Two vertices in $GM_\mathcal{P}$ are connected if the two corresponding matchings have $m-1$ edges in common. In this work we show that $GM_\mathcal{P}$ is connected and give an upper bound of $O(n^2)$ on its diameter. Moreover, we present a tight bound of $\Theta(n)$ for the diameter of the flip graph of points in convex position., Comment: Appeared in CCCG2024

Published

2024

3. Disjoint Compatibility via Graph Classes

Author

Aichholzer, Oswin, Obmann, Julia, Paták, Pavel, Perz, Daniel, Tkadlec, Josef, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

Two plane drawings of graphs on the same set of points are called disjoint compatible if their union is plane and they do not have an edge in common. Let $S$ be a convex point set of $2n \geq 10$ points and let $\mathcal{H}$ be a family of plane drawings on $S$. Two plane perfect matchings $M_1$ and $M_2$ on $S$ (which do not need to be disjoint nor compatible) are \emph{disjoint $\mathcal{H}$-compatible} if there exists a drawing in $\mathcal{H}$ which is disjoint compatible to both $M_1$ and $M_2$ In this work, we consider the graph which has all plane perfect matchings as vertices and where two vertices are connected by an edge if the matchings are disjoint $\mathcal{H}$-compatible. We study the diameter of this graph when $\mathcal{H}$ is the family of all plane spanning trees, caterpillars or paths. We show that in the first two cases the graph is connected with constant and linear diameter, respectively, while in the third case it is disconnected.

Published

2024

4. Connected Matchings

Author

Aichholzer, Oswin, Cabello, Sergio, Mészáros, Viola, Schnider, Patrick, and Soukup, Jan

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

We show that each set of $n\ge 2$ points in the plane in general position has a straight-line matching with at least $(5n+1)/27$ edges whose segments form a connected set, and such a matching can be computed in $O(n \log n)$ time. As an upper bound, we show that for some planar point sets in general position the largest matching whose segments form a connected set has $\lceil \frac{n-1}{3}\rceil$ edges. We also consider a colored version, where each edge of the matching should connect points with different colors., Comment: 20 pages, 14 figures; preliminary version in EuroCG 2024

Published

2024

5. Folding polyominoes into cubes

Author

Aichholzer, Oswin, Lehner, Florian, and Lindorfer, Christian

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

Which polyominoes can be folded into a cube, using only creases along edges of the square lattice underlying the polyomino, with fold angles of $\pm 90^\circ$ and $\pm 180^\circ$, and allowing faces of the cube to be covered multiple times? Prior results studied tree-shaped polyominoes and polyominoes with holes and gave partial classifications for these cases. We show that there is an algorithm deciding whether a given polyomino can be folded into a cube. This algorithm essentially amounts to trying all possible ways of mapping faces of the polyomino to faces of the cube, but (perhaps surprisingly) checking whether such a mapping corresponds to a valid folding is equivalent to the unlink recognition problem from topology. We also give further results on classes of polyominoes which can or cannot be folded into cubes. Our results include (1) a full characterisation of all tree-shaped polyominoes that can be folded into the cube (2) that any rectangular polyomino which contains only one simple hole (out of five different types) does not fold into a cube, (3) a complete characterisation when a rectangular polyomino with two or more unit square holes (but no other holes) can be folded into a cube, and (4) a sufficient condition when a simply-connected polyomino can be folded to a cube. These results answer several open problems of previous work and close the cases of tree-shaped polyominoes and rectangular polyominoes with just one simple hole.

Published

2024

6. Bichromatic Perfect Matchings with Crossings

Author

Aichholzer, Oswin, Felsner, Stefan, Paul, Rosna, Scheucher, Manfred, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

We consider bichromatic point sets with $n$ red and $n$ blue points and study straight-line bichromatic perfect matchings on them. We show that every such point set in convex position admits a matching with at least $\frac{3n^2}{8}-\frac{n}{2}+c$ crossings, for some $ -\frac{1}{2} \leq c \leq \frac{1}{8}$. This bound is tight since for any $k> \frac{3n^2}{8} -\frac{n}{2}+\frac{1}{8}$ there exist bichromatic point sets that do not admit any perfect matching with $k$ crossings., Comment: Appears in the Proceedings of the 31st International Symposium on Graph Drawing and Network Visualization (GD 2023)

Published

2023

7. Different Types of Isomorphisms of Drawings of Complete Multipartite Graphs

Author

Aichholzer, Oswin, Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Computer Science - Computational Geometry

Abstract

Simple drawings are drawings of graphs in which any two edges intersect at most once (either at a common endpoint or a proper crossing), and no edge intersects itself. We analyze several characteristics of simple drawings of complete multipartite graphs: which pairs of edges cross, in which order they cross, and the cyclic order around vertices and crossings, respectively. We consider all possible combinations of how two drawings can share some characteristics and determine which other characteristics they imply and which they do not imply. Our main results are that for simple drawings of complete multipartite graphs, the orders in which edges cross determine all other considered characteristics. Further, if all partition classes have at least three vertices, then the pairs of edges that cross determine the rotation system and the rotation around the crossings determine the extended rotation system. We also show that most other implications -- including the ones that hold for complete graphs -- do not hold for complete multipartite graphs. Using this analysis, we establish which types of isomorphisms are meaningful for simple drawings of complete multipartite graphs., Comment: Appears in the Proceedings of the 31st International Symposium on Graph Drawing and Network Visualization (GD 2023)

Published

2023

8. Towards Crossing-Free Hamiltonian Cycles in Simple Drawings of Complete Graphs

Author

Aichholzer, Oswin, Orthaber, Joachim, and Vogtenhuber, Birgit

Subjects

Mathematics - Combinatorics, Computer Science - Computational Geometry

Abstract

It is a longstanding conjecture that every simple drawing of a complete graph on $n \geq 3$ vertices contains a crossing-free Hamiltonian cycle. We strengthen this conjecture to "there exists a crossing-free Hamiltonian path between each pair of vertices" and show that this stronger conjecture holds for several classes of simple drawings, including strongly c-monotone drawings and cylindrical drawings. As a second main contribution, we give an overview on different classes of simple drawings and investigate inclusion relations between them up to weak isomorphism., Comment: Final version as published in the journal Computing in Geometry and Topology. (30 pages, 22 figures)

Published

2023

9. Drawings of Complete Multipartite Graphs Up to Triangle Flips

Author

Aichholzer, Oswin, Chiu, Man-Kwun, Hoang, Hung P., Hoffmann, Michael, Kynčl, Jan, Maus, Yannic, Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Computer Science - Computational Geometry

Abstract

For a drawing of a labeled graph, the rotation of a vertex or crossing is the cyclic order of its incident edges, represented by the labels of their other endpoints. The extended rotation system (ERS) of the drawing is the collection of the rotations of all vertices and crossings. A drawing is simple if each pair of edges has at most one common point. Gioan's Theorem states that for any two simple drawings of the complete graph $K_n$ with the same crossing edge pairs, one drawing can be transformed into the other by a sequence of triangle flips (a.k.a. Reidemeister moves of Type 3). This operation refers to the act of moving one edge of a triangular cell formed by three pairwise crossing edges over the opposite crossing of the cell, via a local transformation. We investigate to what extent Gioan-type theorems can be obtained for wider classes of graphs. A necessary (but in general not sufficient) condition for two drawings of a graph to be transformable into each other by a sequence of triangle flips is that they have the same ERS. As our main result, we show that for the large class of complete multipartite graphs, this necessary condition is in fact also sufficient. We present two different proofs of this result, one of which is shorter, while the other one yields a polynomial time algorithm for which the number of needed triangle flips for graphs on $n$ vertices is bounded by $O(n^{16})$. The latter proof uses a Carath\'eodory-type theorem for simple drawings of complete multipartite graphs, which we believe to be of independent interest. Moreover, we show that our Gioan-type theorem for complete multipartite graphs is essentially tight in the sense that having the same ERS does not remain sufficient when removing or adding very few edges., Comment: Abstract shortened for arxiv. This work (without appendix) is available at the 39th International Symposium on Computational Geometry (SoCG 2023)

Published

2023

10. Blocking Delaunay Triangulations from the Exterior

Author

Aichholzer, Oswin, Hackl, Thomas, Löffler, Maarten, Pilz, Alexander, Parada, Irene, Scheucher, Manfred, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry, Computer Science - Discrete Mathematics

Abstract

Given two distinct point sets $P$ and $Q$ in the plane, we say that $Q$ \emph{blocks} $P$ if no two points of $P$ are adjacent in any Delaunay triangulation of $P\cup Q$. Aichholzer et al. (2013) showed that any set $P$ of $n$ points in general position can be blocked by $\frac{3}{2}n$ points and that every set $P$ of $n$ points in convex position can be blocked by $\frac{5}{4}n$ points. Moreover, they conjectured that, if $P$ is in convex position, $n$ blocking points are sufficient and necessary. The necessity was recently shown by Biniaz (2021) who proved that every point set in general position requires $n$ blocking points. Here we investigate the variant, where blocking points can only lie outside of the convex hull of the given point set. We show that $\frac{5}{4}n-O(1)$ such \emph{exterior-blocking} points are sometimes necessary, even if the given point set is in convex position. As a consequence we obtain that, if the conjecture of Aichholzer et al. for the original setting was true, then minimal blocking sets of some point configurations $P$ would have to contain points inside of the convex hull of $P$.

Published

2022

11. Perfect Matchings with Crossings

Author

Aichholzer, Oswin, Fabila-Monroy, Ruy, Kindermann, Philipp, Parada, Irene, Paul, Rosna, Perz, Daniel, Schnider, Patrick, and Vogtenhuber, Birgit

Published

2024

12. Twisted Ways to Find Plane Structures in Simple Drawings of Complete Graphs

Author

Aichholzer, Oswin, García, Alfredo, Tejel, Javier, Vogtenhuber, Birgit, and Weinberger, Alexandra

Published

2024

13. Shooting Stars in Simple Drawings of $K_{m,n}$

Author

Aichholzer, Oswin, García, Alfredo, Parada, Irene, Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

Simple drawings are drawings of graphs in which two edges have at most one common point (either a common endpoint, or a proper crossing). It has been an open question whether every simple drawing of a complete bipartite graph $K_{m,n}$ contains a plane spanning tree as a subdrawing. We answer this question to the positive by showing that for every simple drawing of $K_{m,n}$ and for every vertex $v$ in that drawing, the drawing contains a shooting star rooted at $v$, that is, a plane spanning tree containing all edges incident to $v$., Comment: Appears in the Proceedings of the 30th International Symposium on Graph Drawing and Network Visualization (GD 2022)

Published

2022

14. Compatible Spanning Trees in Simple Drawings of $K_n$

Author

Aichholzer, Oswin, Knorr, Kristin, Mulzer, Wolfgang, Maalouly, Nicolas El, Obenaus, Johannes, Paul, Rosna, Reddy, Meghana M., Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Mathematics - Combinatorics, 05C10 (Primary), G.2.2

Abstract

For a simple drawing $D$ of the complete graph $K_n$, two (plane) subdrawings are compatible if their union is plane. Let $\mathcal{T}_D$ be the set of all plane spanning trees on $D$ and $\mathcal{F}(\mathcal{T}_D)$ be the compatibility graph that has a vertex for each element in $\mathcal{T}_D$ and two vertices are adjacent if and only if the corresponding trees are compatible. We show, on the one hand, that $\mathcal{F}(\mathcal{T}_D)$ is connected if $D$ is a cylindrical, monotone, or strongly c-monotone drawing. On the other hand, we show that the subgraph of $\mathcal{F}(\mathcal{T}_D)$ induced by stars, double stars, and twin stars is also connected. In all cases the diameter of the corresponding compatibility graph is at most linear in $n$., Comment: 12 pages, 6 figures, "Appears in the proceedings of the 30th International Symposium on Graph Drawing and Network Visualization (GD 2022)"

Published

2022

15. Reconfiguration of Non-crossing Spanning Trees

Author

Aichholzer, Oswin, Ballinger, Brad, Biedl, Therese, Damian, Mirela, Demaine, Erik D., Korman, Matias, Lubiw, Anna, Lynch, Jayson, Tkadlec, Josef, and Uno, Yushi

Subjects

Computer Science - Computational Geometry, Computer Science - Data Structures and Algorithms, F.2.2

Abstract

For a set $P$ of $n$ points in the plane in general position, a non-crossing spanning tree is a spanning tree of the points where every edge is a straight-line segment between a pair of points and no two edges intersect except at a common endpoint. We study the problem of reconfiguring one non-crossing spanning tree of $P$ to another using a sequence of flips where each flip removes one edge and adds one new edge so that the result is again a non-crossing spanning tree of $P$. There is a known upper bound of $2n-4$ flips [Avis and Fukuda, 1996] and a lower bound of $1.5n - 5$ flips. We give a reconfiguration algorithm that uses at most $2n-3$ flips but reduces that to $1.5n-2$ flips when one tree is a path and either: the points are in convex position; or the path is monotone in some direction. For points in convex position, we prove an upper bound of $2d - \Omega(\log d)$ where $d$ is half the size of the symmetric difference between the trees. We also examine whether the happy edges (those common to the initial and final trees) need to flip, and we find exact minimum flip distances for small point sets using exhaustive search., Comment: 25 pages

Published

2022

16. Geometric Dominating Sets

Author

Aichholzer, Oswin, Eppstein, David, and Hainzl, Eva-Maria

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

We consider a minimizing variant of the well-known \emph{No-Three-In-Line Problem}, the \emph{Geometric Dominating Set Problem}: What is the smallest number of points in an $n\times n$~grid such that every grid point lies on a common line with two of the points in the set? We show a lower bound of $\Omega(n^{2/3})$ points and provide a constructive upper bound of size $2 \lceil n/2 \rceil$. If the points of the dominating sets are required to be in general position we provide optimal solutions for grids of size up to $12 \times 12$. For arbitrary $n$ the currently best upper bound for points in general position remains the obvious $2n$. Finally, we discuss the problem on the discrete torus where we prove an upper bound of $O((n \log n)^{1/2})$. For $n$ even or a multiple of 3, we can even show a constant upper bound of 4. We also mention a number of open questions and some further variations of the problem.

Published

2022

17. Twisted Ways to Find Plane Structures in Simple Drawings of Complete Graphs

Author

Aichholzer, Oswin, García, Alfredo, Tejel, Javier, Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Computer Science - Computational Geometry

Abstract

Simple drawings are drawings of graphs in which the edges are Jordan arcs and each pair of edges share at most one point (a proper crossing or a common endpoint). We introduce a special kind of simple drawings that we call generalized twisted drawings. A simple drawing is generalized twisted if there is a point $O$ such that every ray emanating from $O$ crosses every edge of the drawing at most once and there is a ray emanating from $O$ which crosses every edge exactly once. Via this new class of simple drawings, we show that every simple drawing of the complete graph with $n$ vertices contains $\Omega(n^{\frac{1}{2}})$ pairwise disjoint edges and a plane path of length $\Omega(\frac{\log n }{\log \log n})$. Both results improve over previously known best lower bounds. On the way we show several structural results about and properties of generalized twisted drawings. We further present different characterizations of generalized twisted drawings, which might be of independent interest., Comment: 41 pages, 44 figures, this work (without appendix) will be available in the proceedings of the 38th International Symposium on Computational Geometry (SoCG 2022)

Published

2022

18. Flipping Plane Spanning Paths

Author

Aichholzer, Oswin, Knorr, Kristin, Mulzer, Wolfgang, Obenaus, Johannes, Paul, Rosna, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

Let $S$ be a planar point set in general position, and let $\mathcal{P}(S)$ be the set of all plane straight-line paths with vertex set $S$. A flip on a path $P \in \mathcal{P}(S)$ is the operation of replacing an edge $e$ of $P$ with another edge $f$ on $S$ to obtain a new valid path from $\mathcal{P}(S)$. It is a long-standing open question whether for every given point set $S$, every path from $\mathcal{P}(S)$ can be transformed into any other path from $\mathcal{P}(S)$ by a sequence of flips. To achieve a better understanding of this question, we show that it is sufficient to prove the statement for plane spanning paths whose first edge is fixed. Furthermore, we provide positive answers for special classes of point sets, namely, for wheel sets and generalized double circles (which include, e.g., double chains and double circles).

Published

2022

19. Edge Partitions of Complete Geometric Graphs (Part 2)

Author

Aichholzer, Oswin, Obenaus, Johannes, Orthaber, Joachim, Paul, Rosna, Schnider, Patrick, Steiner, Raphael, Taubner, Tim, and Vogtenhuber, Birgit

Subjects

Mathematics - Combinatorics, Computer Science - Computational Geometry

Abstract

Recently, the second and third author showed that complete geometric graphs on $2n$ vertices in general cannot be partitioned into $n$ plane spanning trees. Building up on this work, in this paper, we initiate the study of partitioning into beyond planar subgraphs, namely into $k$-planar and $k$-quasi-planar subgraphs and obtain first bounds on the number of subgraphs required in this setting.

Published

2021

20. On Crossing-Families in Planar Point Sets

Author

Aichholzer, Oswin, Kynčl, Jan, Scheucher, Manfred, Vogtenhuber, Birgit, and Valtr, Pavel

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

A $k$-crossing family in a point set $S$ in general position is a set of $k$ segments spanned by points of $S$ such that all $k$ segments mutually cross. In this short note we present two statements on crossing families which are based on sets of small cardinality: (1) Any set of at least 15 points contains a crossing family of size 4. (2) There are sets of $n$ points which do not contain a crossing family of size larger than $8\lceil \frac{n}{41} \rceil$. Both results improve the previously best known bounds.

Published

2021

21. Hardness of Token Swapping on Trees

Author

Aichholzer, Oswin, Demaine, Erik D., Korman, Matias, Lynch, Jayson, Lubiw, Anna, Masárová, Zuzana, Rudoy, Mikhail, Williams, Virginia Vassilevska, and Wein, Nicole

Subjects

Computer Science - Data Structures and Algorithms, Computer Science - Computational Complexity

Abstract

Given a graph where every vertex has exactly one labeled token, how can we most quickly execute a given permutation on the tokens? In (sequential) token swapping, the goal is to use the shortest possible sequence of swaps, each of which exchanges the tokens at the two endpoints of an edge of the graph. In parallel token swapping, the goal is to use the fewest rounds, each of which consists of one or more swaps on the edges of a matching. We prove that both of these problems remain NP-hard when the graph is restricted to be a tree. These token swapping problems have been studied by disparate groups of researchers in discrete mathematics, theoretical computer science, robot motion planning, game theory, and engineering. Previous work establishes NP-completeness on general graphs (for both problems); polynomial-time algorithms for simple graph classes such as cliques, stars, paths, and cycles; and constant-factor approximation algorithms in some cases. The two natural cases of sequential and parallel token swapping in trees were first studied over thirty years ago (as "sorting with a transposition tree") and over twenty-five years ago (as "routing permutations via matchings"), yet their complexities were previously unknown. We also show limitations on approximation of sequential token swapping on trees: we identify a broad class of algorithms that encompass all three known polynomial-time algorithms that achieve the best known approximation factor (which is $2$) and show that no such algorithm can achieve an approximation factor less than $2$.

Published

2021

22. On Compatible Matchings

Author

Aichholzer, Oswin, Arroyo, Alan, Masárová, Zuzana, Parada, Irene, Perz, Daniel, Pilz, Alexander, Tkadlec, Josef, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

A matching is compatible to two or more labeled point sets of size $n$ with labels $\{1,\dots,n\}$ if its straight-line drawing on each of these point sets is crossing-free. We study the maximum number of edges in a matching compatible to two or more labeled point sets in general position in the plane. We show that for any two labeled convex sets of $n$ points there exists a compatible matching with $\lfloor \sqrt {2n}\rfloor$ edges. More generally, for any $\ell$ labeled point sets we construct compatible matchings of size $\Omega(n^{1/\ell})$. As a corresponding upper bound, we use probabilistic arguments to show that for any $\ell$ given sets of $n$ points there exists a labeling of each set such that the largest compatible matching has ${\mathcal{O}}(n^{2/({\ell}+1)})$ edges. Finally, we show that $\Theta(\log n)$ copies of any set of $n$ points are necessary and sufficient for the existence of a labeling such that any compatible matching consists only of a single edge.

Published

2021

23. Flipping Plane Spanning Paths

Author

Aichholzer, Oswin, Knorr, Kristin, Mulzer, Wolfgang, Obenaus, Johannes, Paul, Rosna, Vogtenhuber, Birgit, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Lin, Chun-Cheng, editor, Lin, Bertrand M. T., editor, and Liotta, Giuseppe, editor

Published

2023

24. Compatible Spanning Trees in Simple Drawings of

Author

Aichholzer, Oswin, Knorr, Kristin, Mulzer, Wolfgang, El Maalouly, Nicolas, Obenaus, Johannes, Paul, Rosna, M. Reddy, Meghana, Vogtenhuber, Birgit, Weinberger, Alexandra, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Angelini, Patrizio, editor, and von Hanxleden, Reinhard, editor

Published

2023

25. Shooting Stars in Simple Drawings of

Author

Aichholzer, Oswin, García, Alfredo, Parada, Irene, Vogtenhuber, Birgit, Weinberger, Alexandra, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Angelini, Patrizio, editor, and von Hanxleden, Reinhard, editor

Published

2023

26. Plane Spanning Trees in Edge-Colored Simple Drawings of $K_n$

Author

Aichholzer, Oswin, Hoffmann, Michael, Obenaus, Johannes, Paul, Rosna, Perz, Daniel, Seiferth, Nadja, Vogtenhuber, Birgit, and Weinberger, Alexandra

Subjects

Computer Science - Computational Geometry, Computer Science - Discrete Mathematics

Abstract

K\'{a}rolyi, Pach, and T\'{o}th proved that every 2-edge-colored straight-line drawing of the complete graph contains a monochromatic plane spanning tree. It is open if this statement generalizes to other classes of drawings, specifically, to simple drawings of the complete graph. These are drawings where edges are represented by Jordan arcs, any two of which intersect at most once. We present two partial results towards such a generalization. First, we show that the statement holds for cylindrical simple drawings. (In a cylindrical drawing, all vertices are placed on two concentric circles and no edge crosses either circle.) Second, we introduce a relaxation of the problem in which the graph is $k$-edge-colored, and the target structure must be hypochromatic, that is, avoid (at least) one color class. In this setting, we show that every $\lceil (n+5)/6\rceil$-edge-colored monotone simple drawing of $K_n$ contains a hypochromatic plane spanning tree. (In a monotone drawing, every edge is represented as an $x$-monotone curve.), Comment: Appears in the Proceedings of the 28th International Symposium on Graph Drawing and Network Visualization (GD 2020)

Published

2020

27. Drawing Graphs as Spanners

Author

Aichholzer, Oswin, Borrazzo, Manuel, Bose, Prosenjit, Cardinal, Jean, Frati, Fabrizio, Morin, Pat, and Vogtenhuber, Birgit

Subjects

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

Abstract

We study the problem of embedding graphs in the plane as good geometric spanners. That is, for a graph $G$, the goal is to construct a straight-line drawing $\Gamma$ of $G$ in the plane such that, for any two vertices $u$ and $v$ of $G$, the ratio between the minimum length of any path from $u$ to $v$ and the Euclidean distance between $u$ and $v$ is small. The maximum such ratio, over all pairs of vertices of $G$, is the spanning ratio of $\Gamma$. First, we show that deciding whether a graph admits a straight-line drawing with spanning ratio $1$, a proper straight-line drawing with spanning ratio $1$, and a planar straight-line drawing with spanning ratio $1$ are NP-complete, $\exists \mathbb R$-complete, and linear-time solvable problems, respectively, where a drawing is proper if no two vertices overlap and no edge overlaps a vertex. Second, we show that moving from spanning ratio $1$ to spanning ratio $1+\epsilon$ allows us to draw every graph. Namely, we prove that, for every $\epsilon>0$, every (planar) graph admits a proper (resp. planar) straight-line drawing with spanning ratio smaller than $1+\epsilon$. Third, our drawings with spanning ratio smaller than $1+\epsilon$ have large edge-length ratio, that is, the ratio between the length of the longest edge and the length of the shortest edge is exponential. We show that this is sometimes unavoidable. More generally, we identify having bounded toughness as the criterion that distinguishes graphs that admit straight-line drawings with constant spanning ratio and polynomial edge-length ratio from graphs that require exponential edge-length ratio in any straight-line drawing with constant spanning ratio.

Published

2020

28. Folding Polyominoes with Holes into a Cube

Author

Aichholzer, Oswin, Akitaya, Hugo A., Cheung, Kenneth C., Demaine, Erik D., Demaine, Martin L., Fekete, Sándor P., Kleist, Linda, Kostitsyna, Irina, Löffler, Maarten, Masárová, Zuzana, Mundilova, Klara, and Schmidt, Christiane

Subjects

Computer Science - Computational Geometry, F.2.2

Abstract

When can a polyomino piece of paper be folded into a unit cube? Prior work studied tree-like polyominoes, but polyominoes with holes remain an intriguing open problem. We present sufficient conditions for a polyomino with one or several holes to fold into a cube, and conditions under which cube folding is impossible. In particular, we show that all but five special \emph{simple} holes guarantee foldability., Comment: 24 pages, 21 figures

Published

2019

29. On the edge-vertex ratio of maximal thrackles

Author

Aichholzer, Oswin, Kleist, Linda, Klemz, Boris, Schröder, Felix, and Vogtenhuber, Birgit

Subjects

Computer Science - Discrete Mathematics, Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

A drawing of a graph in the plane is a thrackle if every pair of edges intersects exactly once, either at a common vertex or at a proper crossing. Conway's conjecture states that a thrackle has at most as many edges as vertices. In this paper, we investigate the edge-vertex ratio of maximal thrackles, that is, thrackles in which no edge between already existing vertices can be inserted such that the resulting drawing remains a thrackle. For maximal geometric and topological thrackles, we show that the edge-vertex ratio can be arbitrarily small. When forbidding isolated vertices, the edge-vertex ratio of maximal geometric thrackles can be arbitrarily close to the natural lower bound of 1/2. For maximal topological thrackles without isolated vertices, we present an infinite family with an edge-vertex ratio of 5/6., Comment: A preliminary version appears in the Proceedings of the 27th International Symposium on Graph Drawing and Network Visualization (GD 2019)

Published

2019

30. Graphs with large total angular resolution

Author

Aichholzer, Oswin, Korman, Matias, Okamoto, Yoshio, Parada, Irene, Perz, Daniel, van Renssen, André, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

The total angular resolution of a straight-line drawing is the minimum angle between two edges of the drawing. It combines two properties contributing to the readability of a drawing: the angular resolution, which is the minimum angle between incident edges, and the crossing resolution, which is the minimum angle between crossing edges. We consider the total angular resolution of a graph, which is the maximum total angular resolution of a straight-line drawing of this graph. We prove that, up to a finite number of well specified exceptions of constant size, the number of edges of a graph with $n$ vertices and a total angular resolution greater than $60^{\circ}$ is bounded by $2n-6$. This bound is tight. In addition, we show that deciding whether a graph has total angular resolution at least $60^{\circ}$ is NP-hard., Comment: Some parts appeared in the Proceedings of the 27th International Symposium on Graph Drawing and Network Visualization (GD 2019)

Published

2019

31. On the 2-colored crossing number

Author

Aichholzer, Oswin, Fabila-Monroy, Ruy, Fuchs, Adrian, Hidalgo-Toscano, Carlos, Parada, Irene, Vogtenhuber, Birgit, and Zaragoza, Francisco

Subjects

Computer Science - Computational Geometry, Mathematics - Combinatorics

Abstract

Let $D$ be a straight-line drawing of a graph. The rectilinear 2-colored crossing number of $D$ is the minimum number of crossings between edges of the same color, taken over all possible 2-colorings of the edges of $D$. First, we show lower and upper bounds on the rectilinear 2-colored crossing number for the complete graph $K_n$. To obtain this result, we prove that asymptotic bounds can be derived from optimal and near-optimal instances with few vertices. We obtain such instances using a combination of heuristics and integer programming. Second, for any fixed drawing of $K_n$, we improve the bound on the ratio between its rectilinear 2-colored crossing number and its rectilinear crossing number., Comment: Appears in the Proceedings of the 27th International Symposium on Graph Drawing and Network Visualization (GD 2019)

Published

2019

32. Minimal Representations of Order Types by Geometric Graphs

Author

Aichholzer, Oswin, Balko, Martin, Hoffmann, Michael, Kynčl, Jan, Mulzer, Wolfgang, Parada, Irene, Pilz, Alexander, Scheucher, Manfred, Valtr, Pavel, Vogtenhuber, Birgit, and Welzl, Emo

Subjects

Mathematics - Combinatorics, Computer Science - Computational Geometry

Abstract

In order to have a compact visualization of the order type of a given point set S, we are interested in geometric graphs on S with few edges that unambiguously display the order type of S. We introduce the concept of exit edges, which prevent the order type from changing under continuous motion of vertices. That is, in the geometric graph on S whose edges are the exit edges, in order to change the order type of S, at least one vertex needs to move across an exit edge. Exit edges have a natural dual characterization, which allows us to efficiently compute them and to bound their number., Comment: Updated to the final version to appear in the Journal of Graph Algorithms and Applications

Published

2019

33. Transformed flips in triangulations and matchings

Author

Aichholzer, Oswin, Andritsch, Lukas, Baur, Karin, and Vogtenhuber, Birgit

Subjects

Mathematics - Combinatorics, 05E15

Abstract

Plane perfect matchings of $2n$ points in convex position are in bijection with triangulations of convex polygons of size $n+2$. Edge flips are a classic operation to perform local changes both structures have in common. In this work, we use the explicit bijection from Aichholzer et al. (2018) to determine the effect of an edge flip on the one side of the bijection to the other side, that is, we show how the two different types of edge flips are related. Moreover, we give an algebraic interpretation of the flip graph of triangulations in terms of elements of the corresponding Temperley-Lieb algebra., Comment: 17 pages, 19 figures

Published

2019

34. An Ongoing Project to Improve the Rectilinear and the Pseudolinear Crossing Constants

Author

Aichholzer, Oswin, Duque, Frank, Fabila-Monroy, Ruy, Hidalgo-Toscano, Carlos, and García-Quintero, Oscar E.

Subjects

Mathematics - Combinatorics, Computer Science - Computational Geometry

Abstract

A drawing of a graph in the plane is {\it pseudolinear} if the edges of the drawing can be extended to doubly-infinite curves that form an arrangement of pseudolines, that is, any pair of edges crosses precisely once. A special case are {\it rectilinear} drawings where the edges of the graph are drawn as straight line segments. The rectilinear (pseudolinear) crossing number of a graph is the minimum number of pairs of edges of the graph that cross in any of its rectilinear (pseudolinear) drawings. In this paper we describe an ongoing project to continuously obtain better asymptotic upper bounds on the rectilinear and pseudolinear crossing number of the complete graph $K_n$.

Published

2019

35. Flip distances between graph orientations

Author

Aichholzer, Oswin, Cardinal, Jean, Huynh, Tony, Knauer, Kolja, Mütze, Torsten, Steiner, Raphael, and Vogtenhuber, Birgit

Subjects

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

Abstract

Flip graphs are a ubiquitous class of graphs, which encode relations induced on a set of combinatorial objects by elementary, local changes. Skeletons of associahedra, for instance, are the graphs induced by quadrilateral flips in triangulations of a convex polygon. For some definition of a flip graph, a natural computational problem to consider is the flip distance: Given two objects, what is the minimum number of flips needed to transform one into the other? We consider flip graphs on orientations of simple graphs, where flips consist of reversing the direction of some edges. More precisely, we consider so-called $\alpha$-orientations of a graph $G$, in which every vertex $v$ has a specified outdegree $\alpha(v)$, and a flip consists of reversing all edges of a directed cycle. We prove that deciding whether the flip distance between two $\alpha$-orientations of a planar graph $G$ is at most two is \NP-complete. This also holds in the special case of perfect matchings, where flips involve alternating cycles. This problem amounts to finding geodesics on the common base polytope of two partition matroids, or, alternatively, on an alcoved polytope. It therefore provides an interesting example of a flip distance question that is computationally intractable despite having a natural interpretation as a geodesic on a nicely structured combinatorial polytope. We also consider the dual question of the flip distance betwe en graph orientations in which every cycle has a specified number of forward edges, and a flip is the reversal of all edges in a minimal directed cut. In general, the problem remains hard. However, if we restrict to flips that only change sinks into sources, or vice-versa, then the problem can be solved in polynomial time. Here we exploit the fact that the flip graph is the cover graph of a distributive lattice. This generalizes a recent result from Zhang, Qian, and Zhang.

Published

2019

36. Drawing Graphs as Spanners

Author

Aichholzer, Oswin, Borrazzo, Manuel, Bose, Prosenjit, Cardinal, Jean, Frati, Fabrizio, Morin, Pat, and Vogtenhuber, Birgit

Published

2022

37. Flipping Plane Spanning Paths

Author

Aichholzer, Oswin, primary, Knorr, Kristin, additional, Mulzer, Wolfgang, additional, Obenaus, Johannes, additional, Paul, Rosna, additional, and Vogtenhuber, Birgit, additional

Published

2023

38. Different Types of Isomorphisms of Drawings of Complete Multipartite Graphs

Author

Aichholzer, Oswin, primary, Vogtenhuber, Birgit, additional, and Weinberger, Alexandra, additional

Published

2023

39. Disjoint Compatibility via Graph Classes

Author

Aichholzer, Oswin, Obmann, Julia, Paták, Pavel, Perz, Daniel, Tkadlec, Josef, Vogtenhuber, Birgit, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Bekos, Michael A., editor, and Kaufmann, Michael, editor

Published

2022

40. Perfect Matchings with Crossings

Author

Aichholzer, Oswin, Fabila-Monroy, Ruy, Kindermann, Philipp, Parada, Irene, Paul, Rosna, Perz, Daniel, Schnider, Patrick, Vogtenhuber, Birgit, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Bazgan, Cristina, editor, and Fernau, Henning, editor

Published

2022

41. Graphs with large total angular resolution

Author

Aichholzer, Oswin, Korman, Matias, Okamoto, Yoshio, Parada, Irene, Perz, Daniel, van Renssen, André, and Vogtenhuber, Birgit

Published

2023

42. Geometric dominating sets - a minimum version of the No-Three-In-Line Problem

Author

Aichholzer, Oswin, Eppstein, David, and Hainzl, Eva-Maria

Published

2023

43. On crossing-families in planar point sets

Author

Aichholzer, Oswin, Kynčl, Jan, Scheucher, Manfred, Vogtenhuber, Birgit, and Valtr, Pavel

Published

2022

44. Folding Polyominoes into (Poly)Cubes

Author

Aichholzer, Oswin, Biro, Michael, Demaine, Erik D., Demaine, Martin L., Eppstein, David, Fekete, Sándor P., Hesterberg, Adam, Kostitsyna, Irina, and Schmidt, Christiane

Subjects

Computer Science - Computational Geometry, F.2.2

Abstract

We study the problem of folding a polyomino $P$ into a polycube $Q$, allowing faces of $Q$ to be covered multiple times. First, we define a variety of folding models according to whether the folds (a) must be along grid lines of $P$ or can divide squares in half (diagonally and/or orthogonally), (b) must be mountain or can be both mountain and valley, (c) can remain flat (forming an angle of $180^\circ$), and (d) must lie on just the polycube surface or can have interior faces as well. Second, we give all the inclusion relations among all models that fold on the grid lines of $P$. Third, we characterize all polyominoes that can fold into a unit cube, in some models. Fourth, we give a linear-time dynamic programming algorithm to fold a tree-shaped polyomino into a constant-size polycube, in some models. Finally, we consider the triangular version of the problem, characterizing which polyiamonds fold into a regular tetrahedron., Comment: 30 pages, 19 figures, full version of extended abstract that appeared in CCCG 2015. (Change over previous version: Fixed a missing reference.)

Published

2017

45. Perfect k-colored matchings and (k+2)-gonal tilings

Author

Aichholzer, Oswin, Andritsch, Lukas, Baur, Karin, and Vogtenhuber, Birgit

Subjects

Mathematics - Combinatorics

Abstract

We derive a simple bijection between geometric plane perfect matchings on $2n$ points in convex position and triangulations on $n+2$ points in convex position. We then extend this bijection to monochromatic plane perfect matchings on periodically $k$-colored vertices and $(k+2)$-gonal tilings of convex point sets. These structures are related to a generalization of Temperley-Lieb algebras and our bijections provide explicit one-to-one relations between matchings and tilings. Moreover, for a given element of one class, the corresponding element of the other class can be computed in linear time., Comment: 12 pages, 8 figures

Published

2017

46. Geodesic Order Types

Author

Aichholzer, Oswin, Korman, Matias, Pilz, Alexander, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

The geodesic between two points $a$ and $b$ in the interior of a simple polygon~$P$ is the shortest polygonal path inside $P$ that connects $a$ to $b$. It is thus the natural generalization of straight line segments on unconstrained point sets to polygonal environments. In this paper we use this extension to generalize the concept of the order type of a set of points in the Euclidean plane to geodesic order types. In particular, we show that, for any set $S$ of points and an ordered subset $\mathcal{B} \subseteq S$ of at least four points, one can always construct a polygon $P$ such that the points of $\mathcal{B}$ define the geodesic hull of~$S$ w.r.t.~$P$, in the specified order. Moreover, we show that an abstract order type derived from the dual of the Pappus arrangement can be realized as a geodesic order type., Comment: This paper was published in Algorithmica, September 2014, Volume 70, Issue 1, pp 112-128

Published

2017

47. Packing Plane Spanning Trees and Paths in Complete Geometric Graphs

Author

Aichholzer, Oswin, Hackl, Thomas, Korman, Matias, van Kreveld, Marc, Löffler, Maarten, Pilz, Alexander, Speckmann, Bettina, and Welzl, Emo

Subjects

Computer Science - Computational Geometry

Abstract

We consider the following question: How many edge-disjoint plane spanning trees are contained in a complete geometric graph $GK_n$ on any set $S$ of $n$ points in general position in the plane? We show that this number is in $\Omega(\sqrt{n})$. Further, we consider variants of this problem by bounding the diameter and the degree of the trees (in particular considering spanning paths)., Comment: This work was presented at the 26th Canadian Conference on Computational Geometry (CCCG 2014), Halifax, Nova Scotia, Canada, 2014. The journal version appeared in Information Processing Letters, 124 (2017), 35--41

Published

2017

48. Packing Short Plane Spanning Graphs in Complete Geometric Graphs

Author

Aichholzer, Oswin, Hackl, Thomas, Korman, Matias, Pilz, Alexander, Rote, Günter, van Renssen, André, Roeloffzen, Marcel, and Vogtenhuber, Birgit

Subjects

Computer Science - Computational Geometry

Abstract

Given a set of points in the plane, we want to establish a connection network between these points that consists of several disjoint layers. Motivated by sensor networks, we want that each layer is spanning and plane, and that no edge is very long (when compared to the minimum length needed to obtain a spanning graph). We consider two different approaches: first we show an almost optimal centralized approach to extract two graphs. Then we show a constant factor approximation for a distributed model in which each point can compute its adjacencies using only local information. In both cases the obtained layers are plane, Comment: Preliminary version appeared in the proceedings of the 27th International Symposium on Algorithms and Computation (ISAAC 2016), Leibniz International Proceedings in Informatics (LIPIcs), Vol. 64, pp. 9:1-9:12

Published

2017

49. A superlinear lower bound on the number of 5-holes

Author

Aichholzer, Oswin, Balko, Martin, Hackl, Thomas, Kynčl, Jan, Parada, Irene, Scheucher, Manfred, Valtr, Pavel, and Vogtenhuber, Birgit

Subjects

Mathematics - Combinatorics, 52C10, G.2.1

Abstract

Let $P$ be a finite set of points in the plane in general position, that is, no three points of $P$ are on a common line. We say that a set $H$ of five points from $P$ is a $5$-hole in $P$ if $H$ is the vertex set of a convex $5$-gon containing no other points of $P$. For a positive integer $n$, let $h_5(n)$ be the minimum number of 5-holes among all sets of $n$ points in the plane in general position. Despite many efforts in the last 30 years, the best known asymptotic lower and upper bounds for $h_5(n)$ have been of order $\Omega(n)$ and $O(n^2)$, respectively. We show that $h_5(n) = \Omega(n\log^{4/5}{n})$, obtaining the first superlinear lower bound on $h_5(n)$. The following structural result, which might be of independent interest, is a crucial step in the proof of this lower bound. If a finite set $P$ of points in the plane in general position is partitioned by a line $\ell$ into two subsets, each of size at least 5 and not in convex position, then $\ell$ intersects the convex hull of some 5-hole in $P$. The proof of this result is computer-assisted., Comment: 30 pages, 14 figures, minor changes and Theorem 3 and its proof were added

Published

2017

50. Plane Spanning Trees in Edge-Colored Simple Drawings of

Author

Aichholzer, Oswin, Hoffmann, Michael, Obenaus, Johannes, Paul, Rosna, Perz, Daniel, Seiferth, Nadja, Vogtenhuber, Birgit, Weinberger, Alexandra, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Auber, David, editor, and Valtr, Pavel, editor

Published

2020