Henry Förster scite author profile

The crossing resolution of a non-planar drawing of a graph is the value of the minimum angle formed by any pair of crossing edges. Recent experiments suggest that the larger the crossing resolution is, the easier it is to read and interpret a drawing of a graph. However, maximizing the crossing resolution turns out to be an NP-hard problem in general, and only heuristic algorithms are known that are mainly based on appropriately adjusting force-directed algorithms. In this paper, we propose a new heuristic algorithm for the crossing resolution maximization problem and we experimentally compare it against the known approaches from the literature. Our experimental evaluation indicates that the new heuristic produces drawings with better crossing resolution, but this comes at the cost of slightly higher edge-length ratio, especially when the input graph is large.

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On Arrangements of Orthogonal Circles

Chaplick

Förster

Kryven

et al. 2019

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In this paper, we study arrangements of orthogonal circles, that is, arrangements of circles where every pair of circles must either be disjoint or intersect at a right angle. Using geometric arguments, we show that such arrangements have only a linear number of faces. This implies that orthogonal circle intersection graphs have only a linear number of edges. When we restrict ourselves to orthogonal unit circles, the resulting class of intersection graphs is a subclass of penny graphs (that is, contact graphs of unit circles). We show that, similarly to penny graphs, it is NPhard to recognize orthogonal unit circle intersection graphs.

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Planar Graphs of Bounded Degree Have Bounded Queue Number

Bekos¹,

Förster²,

Gronemann³

et al. 2019

SIAM J. Comput.

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On Strict (Outer-)Confluent Graphs

Förster¹,

Ganian²,

Klute³

et al. 2021

JGAA

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A strict confluent (SC) graph drawing is a drawing of a graph with vertices as points in the plane, where vertex adjacencies are represented not by individual curves but rather by unique smooth paths through a planar system of junctions and arcs. If all vertices of the graph lie in the outer face of the drawing, the drawing is called a strict outerconfluent (SOC) drawing. SC and SOC graphs were first considered by Eppstein et al. in Graph Drawing 2013. Here, we establish several new relationships between the class of SC graphs and other graph classes, in particular string graphs and unit-interval graphs. Further, we extend earlier results about special bipartite graph classes to the notion of strict outerconfluency, show that SOC graphs have cop number two, and establish that tree-like ($\Delta$-)SOC graphs have bounded cliquewidth.

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Henry Förster

Hydrogen atoms in arbitrary magnetic fields. II. Bound-bound transitions

A Heuristic Approach Towards Drawings of Graphs With High Crossing Resolution

On Arrangements of Orthogonal Circles

Planar Graphs of Bounded Degree Have Bounded Queue Number

On Strict (Outer-)Confluent Graphs

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