2016
DOI: 10.1007/978-3-319-50106-2_36
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Hanani-Tutte for Radial Planarity II

Abstract: Abstract. A drawing of a graph G is radial if the vertices of G are placed on concentric circles C1, . . . , C k with common center c, and edges are drawn radially: every edge intersects every circle centered at c at most once. G is radial planar if it has a radial embedding, that is, a crossing-free radial drawing. If the vertices of G are ordered or partitioned into ordered levels (as they are for leveled graphs), we require that the assignment of vertices to circles corresponds to the given ordering or leve… Show more

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Cited by 7 publications
(17 citation statements)
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“…There is also work on applying Hanani-Tutte to different planarity variants, see, for example, [13,14,15,17,32]. A variant of the (strong) Hanani-Tutte theorem in the context of approximating maps of graphs, which works on any surface, was recently announced in a paper co-authored by the first author [7].…”
Section: Known Resultsmentioning
confidence: 99%

Strong Hanani-Tutte for the Torus

Fulek,
Pelsmajer,
Schaefer
2020
Preprint
Self Cite
“…There is also work on applying Hanani-Tutte to different planarity variants, see, for example, [13,14,15,17,32]. A variant of the (strong) Hanani-Tutte theorem in the context of approximating maps of graphs, which works on any surface, was recently announced in a paper co-authored by the first author [7].…”
Section: Known Resultsmentioning
confidence: 99%

Strong Hanani-Tutte for the Torus

Fulek,
Pelsmajer,
Schaefer
2020
Preprint
Self Cite
“…4 (a). Therefore, we introduce constraint (6). For each edge e in E + i ∪ E − i it remains to decide whether it is embedded locally to the left or to the right of ε i .…”
Section: Radial Level Planaritymentioning
confidence: 99%
“…This results in a novel polynomial-time algorithm for testing radial level planarity by testing satisfiability of a system of constraints that, much like the work of Randerath et al, is obtained from omitting all transitivity constraints from a constraint system that trivially models radial level planarity. Currently, we deduce the correctness of the new algorithm from the strong Hanani-Tutte theorem for radial level planarity [6]. However, also this transformation works both ways, and a new correctness proof of our algorithm in…”
Section: Introductionmentioning
confidence: 99%
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