Your search keyword '"Katheder, Julia"' showing total 8 results

1. On $k$-Plane Insertion into Plane Drawings

Author

Katheder, Julia, Kindermann, Philipp, Klute, Fabian, Parada, Irene, Rutter, Ignaz, Katheder, Julia, Kindermann, Philipp, Klute, Fabian, Parada, Irene, and Rutter, Ignaz

Abstract

We introduce the $k$-Plane Insertion into Plane drawing ($k$-PIP) problem: given a plane drawing of a planar graph $G$ and a set of edges $F$, insert the edges in $F$ into the drawing such that the resulting drawing is $k$-plane. In this paper, we focus on the $1$-PIP scenario. We present a linear-time algorithm for the case that $G$ is a triangulation, while proving NP-completeness for the case that $G$ is biconnected and $F$ forms a path or a matching.

Published

2024

2. Axis-Parallel Right Angle Crossing Graphs

Author

Patrizio Angelini and Michael A. Bekos and Julia Katheder and Michael Kaufmann and Maximilian Pfister and Torsten Ueckerdt, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, Ueckerdt, Torsten, Patrizio Angelini and Michael A. Bekos and Julia Katheder and Michael Kaufmann and Maximilian Pfister and Torsten Ueckerdt, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, and Ueckerdt, Torsten

Abstract

A RAC graph is one admitting a RAC drawing, that is, a polyline drawing in which each crossing occurs at a right angle. Originally motivated by psychological studies on readability of graph layouts, RAC graphs form one of the most prominent graph classes in beyond planarity. In this work, we study a subclass of RAC graphs, called axis-parallel RAC (or apRAC, for short), that restricts the crossings to pairs of axis-parallel edge-segments. apRAC drawings combine the readability of planar drawings with the clarity of (non-planar) orthogonal drawings. We consider these graphs both with and without bends. Our contribution is as follows: (i) We study inclusion relationships between apRAC and traditional RAC graphs. (ii) We establish bounds on the edge density of apRAC graphs. (iii) We show that every graph with maximum degree 8 is 2-bend apRAC and give a linear time drawing algorithm. Some of our results on apRAC graphs also improve the state of the art for general RAC graphs. We conclude our work with a list of open questions and a discussion of a natural generalization of the apRAC model.

Published

2023

3. Simultaneous Drawing of Layered Trees

Author

Katheder, Julia, Kobourov, Stephen G., Kuckuk, Axel, Pfister, Maximilian, Zink, Johannes, Katheder, Julia, Kobourov, Stephen G., Kuckuk, Axel, Pfister, Maximilian, and Zink, Johannes

Abstract

We study the crossing-minimization problem in a layered graph drawing of planar-embedded rooted trees whose leaves have a given total order on the first layer, which adheres to the embedding of each individual tree. The task is then to permute the vertices on the other layers (respecting the given tree embeddings) in order to minimize the number of crossings. While this problem is known to be NP-hard for multiple trees even on just two layers, we describe a dynamic program running in polynomial time for the restricted case of two trees. If there are more than two trees, we restrict the number of layers to three, which allows for a reduction to a shortest-path problem. This way, we achieve XP-time in the number of trees., Comment: Appears in Proc. 18th International Conference and Workshops on Algorithms and Computation 2024 (WALCOM'24)

Published

2023

4. Evaluating Animation Parameters for Morphing Edge Drawings

Author

Binucci, Carla, Förster, Henry, Katheder, Julia, Tappini, Alessandra, Binucci, Carla, Förster, Henry, Katheder, Julia, and Tappini, Alessandra

Abstract

Partial edge drawings (PED) of graphs avoid edge crossings by subdividing each edge into three parts and representing only its stubs, i.e., the parts incident to the end-nodes. The morphing edge drawing model (MED) extends the PED drawing style by animations that smoothly morph each edge between its representation as stubs and the one as a fully drawn segment while avoiding new crossings. Participants of a previous study on MED (Misue and Akasaka, GD19) reported eye straining caused by the animation. We conducted a user study to evaluate how this effect is influenced by varying animation speed and animation dynamic by considering an easing technique that is commonly used in web design. Our results provide indications that the easing technique may help users in executing topology-based tasks accurately. The participants also expressed appreciation for the easing and a preference for a slow animation speed., Comment: Appears in the Proceedings of the 31st International Symposium on Graph Drawing and Network Visualization (GD 2023)

Published

2023

5. Weakly and Strongly Fan-Planar Graphs

Author

Cheong, Otfried, Förster, Henry, Katheder, Julia, Pfister, Maximilian, Schlipf, Lena, Cheong, Otfried, Förster, Henry, Katheder, Julia, Pfister, Maximilian, and Schlipf, Lena

Abstract

We study two notions of fan-planarity introduced by (Cheong et al., GD22), called weak and strong fan-planarity, which separate two non-equivalent definitions of fan-planarity in the literature. We prove that not every weakly fan-planar graph is strongly fan-planar, while the upper bound on the edge density is the same for both families., Comment: Appears in the Proceedings of the 31st International Symposium on Graph Drawing and Network Visualization (GD 2023)

Published

2023

6. Axis-Parallel Right Angle Crossing Graphs

Author

Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, Ueckerdt, Torsten, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, and Ueckerdt, Torsten

Abstract

A RAC graph is one admitting a RAC drawing, that is, a polyline drawing in which each crossing occurs at a right angle. Originally motivated by psychological studies on readability of graph layouts, RAC graphs form one of the most prominent graph classes in beyond planarity. In this work, we study a subclass of RAC graphs, called axis-parallel RAC (or apRAC, for short), that restricts the crossings to pairs of axis-parallel edge-segments. apRAC drawings combine the readability of planar drawings with the clarity of (non-planar) orthogonal drawings. We consider these graphs both with and without bends. Our contribution is as follows: (i) We study inclusion relationships between apRAC and traditional RAC graphs. (ii) We establish bounds on the edge density of apRAC graphs. (iii) We show that every graph with maximum degree 8 is 2-bend apRAC and give a linear time drawing algorithm. Some of our results on apRAC graphs also improve the state of the art for general RAC graphs. We conclude our work with a list of open questions and a discussion of a natural generalization of the apRAC model.

Published

2023

7. RAC Drawings of Graphs with Low Degree

Author

Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, and Pfister, Maximilian

Abstract

Motivated by cognitive experiments providing evidence that large crossing-angles do not impair the readability of a graph drawing, RAC (Right Angle Crossing) drawings were introduced to address the problem of producing readable representations of non-planar graphs by supporting the optimal case in which all crossings form 90{\deg} angles. In this work, we make progress on the problem of finding RAC drawings of graphs of low degree. In this context, a long-standing open question asks whether all degree-3 graphs admit straight-line RAC drawings. This question has been positively answered for the Hamiltonian degree-3 graphs. We improve on this result by extending to the class of 3-edge-colorable degree-3 graphs. When each edge is allowed to have one bend, we prove that degree-4 graphs admit such RAC drawings, a result which was previously known only for degree-3 graphs. Finally, we show that 7-edge-colorable degree-7 graphs admit RAC drawings with two bends per edge. This improves over the previous result on degree-6 graphs., Comment: Extended version of a paper presented at MFCS 2022

Published

2022

8. RAC Drawings of Graphs with Low Degree

Author

Patrizio Angelini and Michael A. Bekos and Julia Katheder and Michael Kaufmann and Maximilian Pfister, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, Pfister, Maximilian, Patrizio Angelini and Michael A. Bekos and Julia Katheder and Michael Kaufmann and Maximilian Pfister, Angelini, Patrizio, Bekos, Michael A., Katheder, Julia, Kaufmann, Michael, and Pfister, Maximilian

Abstract

Motivated by cognitive experiments providing evidence that large crossing-angles do not impair the readability of a graph drawing, RAC (Right Angle Crossing) drawings were introduced to address the problem of producing readable representations of non-planar graphs by supporting the optimal case in which all crossings form 90° angles. In this work, we make progress on the problem of finding RAC drawings of graphs of low degree. In this context, a long-standing open question asks whether all degree-3 graphs admit straight-line RAC drawings. This question has been positively answered for the Hamiltonian degree-3 graphs. We improve on this result by extending to the class of 3-edge-colorable degree-3 graphs. When each edge is allowed to have one bend, we prove that degree-4 graphs admit such RAC drawings, a result which was previously known only for degree-3 graphs. Finally, we show that 7-edge-colorable degree-7 graphs admit RAC drawings with two bends per edge. This improves over the previous result on degree-6 graphs.

Published

2022