Clustered planarity testing revisited

被引：0

作者：

Fulek, Radoslav ^{[1
]}

Kyncl, Jan ^{[2
,3
,4
]}

Malinovic, Igor ^{[5
]}

Palvoelgyi, Doemoetoer ^{[6
]}

机构：

[1] IST Austria, Klosterneuburg, Austria

[2] Charles Univ Prague, Dept Appl Math, Fac Math & Phys, CR-11800 Prague, Czech Republic

[3] Charles Univ Prague, Inst Theoret Comp Sci, Fac Math & Phys, Prague, Czech Republic

[4] Ecole Polytech Fed Lausanne, Chair Combinatorial Geometry, Lausanne, Switzerland

[5] Ecole Polytech Fed Lausanne, Chair Discrete Optimizat, Lausanne, Switzerland

[6] Eotvos Lorand Univ, Inst Math, Budapest, Hungary

来源：

ELECTRONIC JOURNAL OF COMBINATORICS | 2015年 / 22卷 / 04期

基金：

瑞士国家科学基金会;

关键词：

graph planarity; clustered planarity; Hanani-Tutte theorem; matroid intersection algorithm; HANANI-TUTTE; BOUNDS;

D O I：

暂无

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

The Hanani-Tutte theorem is a classical result proved for the first time in the 1930s that characterizes planar graphs as graphs that admit a drawing in the plane in which every pair of edges not sharing a vertex cross an even number of times. We generalize this result to clustered graphs with two disjoint clusters, and show that a straightforward extension to flat clustered graphs with three or more disjoint clusters is not possible. For general clustered graphs we show a variant of the Hanani-Tutte theorem in the case when each cluster induces a connected subgraph. Di Battista and Frati proved that clustered planarity of embedded clustered graphs whose every face is incident to at most five vertices can be tested in polynomial time. We give a new and short proof of this result, using the matroid intersection algorithm.

引用

页数：29

共 50 条

[1] Clustered Planarity Testing Revisited
Fulek, Radoslav
Kyncl, Jan
Malinovic, Igor
Palvoelgyi, Domotor
[J]. GRAPH DRAWING (GD 2014), 2014, 8871 : 428 - 439
[2] Planarity Testing Revisited
Datta, Samir
Prakriya, Gautam
[J]. THEORY AND APPLICATIONS OF MODELS OF COMPUTATION, TAMC 2011, 2011, 6648 : 540 - 551
[3] Clustered Planarity = Flat Clustered Planarity
Cortese, Pier Francesco
Patrignani, Maurizio
[J]. GRAPH DRAWING AND NETWORK VISUALIZATION, GD 2018, 2018, 11282 : 23 - 38
[4] Clustered Planarity with Pipes
Patrizio Angelini
Giordano Da Lozzo
[J]. Algorithmica, 2019, 81 : 2484 - 2526
[5] Clustered level planarity
Forster, M
Bachmaier, C
[J]. SOFSEM 2004: THEORY AND PRACTICE OF COMPUTER SCIENCE, PROCEEDINGS, 2004, 2932 : 218 - 228
[6] Clustered Planarity with Pipes
Angelini, Patrizio
Da Lozzo, Giordano
[J]. ALGORITHMICA, 2019, 81 (06) : 2484 - 2526
[7] Advances on Testing C-Planarity of Embedded Flat Clustered Graphs
Chimani, Markus
Di Battista, Giuseppe
Frati, Fabrizio
Klein, Karsten
[J]. GRAPH DRAWING (GD 2014), 2014, 8871 : 416 - 427
[8] Advances on Testing C-Planarity of Embedded Flat Clustered Graphs
Chimani, Markus
Di Battista, Giuseppe
Frati, Fabrizio
Klein, Karsten
[J]. INTERNATIONAL JOURNAL OF FOUNDATIONS OF COMPUTER SCIENCE, 2019, 30 (02) : 197 - 230
[9] Relaxing the constraints of clustered planarity
Angelini, Patrizio
Da Lozzo, Giordano
Di Battista, Giuseppe
Frati, Fabrizio
Patrignani, Maurizio
Roselli, Vincenzo
[J]. COMPUTATIONAL GEOMETRY-THEORY AND APPLICATIONS, 2015, 48 (02): : 42 - 75
[10] A Note on Obstructions to Clustered Planarity
Sneddon, Jamie
Bonnington, Paul
[J]. ELECTRONIC JOURNAL OF COMBINATORICS, 2011, 18 (01):

← 1 2 3 4 5 →