Point-set embeddability of 2-colored trees

Fabrizio Frati; Marc Glisse; William J. Lenhart; Giuseppe Liotta; Tamara Mchedlidze; Rahnuma Islam Nishat

doi:10.1007/978-3-642-36763-2_26

Point-set embeddability of 2-colored trees

Fabrizio Frati, Marc Glisse, William J. Lenhart, Giuseppe Liotta, Tamara Mchedlidze, Rahnuma Islam Nishat

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

In this paper we study bichromatic point-set embeddings of 2-colored trees on 2-colored point sets, i.e., point-set embeddings of trees (whose vertices are colored red and blue) on point sets (whose points are colored red and blue) such that each red (blue) vertex is mapped to a red (resp. blue) point. We prove that deciding whether a given 2-colored tree admits a bichromatic point-set embedding on a given convex point set is an NP-complete problem; we also show that the same problem is linear-time solvable if the convex point set does not contain two consecutive points with the same color. Furthermore, we prove a 3n/2 - O(1) lower bound and a 2n upper bound (a 7n/6 - O(log n) lower bound and a 4n/3 upper bound) on the minimum size of a universal point set for straight-line bichromatic embeddings of 2-colored trees (resp. 2-colored binary trees). Finally, we show that universal convex point sets with n points exist for 1-bend bichromatic point-set embeddings of 2-colored trees.

Original language	English
Title of host publication	Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers
Pages	291-302
Number of pages	12
DOIs	https://doi.org/10.1007/978-3-642-36763-2_26
Publication status	Published - 26 Feb 2013
Externally published	Yes
Event	20th International Symposium on Graph Drawing, GD 2012 - Redmond, WA, United States Duration: 19 Sept 2012 → 21 Sept 2012

Publication series

Name	Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
Volume	7704 LNCS
ISSN (Print)	0302-9743
ISSN (Electronic)	1611-3349

Conference

Conference	20th International Symposium on Graph Drawing, GD 2012
Country/Territory	United States
City	Redmond, WA
Period	19/09/12 → 21/09/12

Access to Document

10.1007/978-3-642-36763-2_26

Cite this

Frati, F., Glisse, M., Lenhart, W. J., Liotta, G., Mchedlidze, T., & Nishat, R. I. (2013). Point-set embeddability of 2-colored trees. In Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers (pp. 291-302). (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); Vol. 7704 LNCS). https://doi.org/10.1007/978-3-642-36763-2_26

@inproceedings{809ce05c7cf7440f861ecfc1bf935461,

title = "Point-set embeddability of 2-colored trees",

abstract = "In this paper we study bichromatic point-set embeddings of 2-colored trees on 2-colored point sets, i.e., point-set embeddings of trees (whose vertices are colored red and blue) on point sets (whose points are colored red and blue) such that each red (blue) vertex is mapped to a red (resp. blue) point. We prove that deciding whether a given 2-colored tree admits a bichromatic point-set embedding on a given convex point set is an NP-complete problem; we also show that the same problem is linear-time solvable if the convex point set does not contain two consecutive points with the same color. Furthermore, we prove a 3n/2 - O(1) lower bound and a 2n upper bound (a 7n/6 - O(log n) lower bound and a 4n/3 upper bound) on the minimum size of a universal point set for straight-line bichromatic embeddings of 2-colored trees (resp. 2-colored binary trees). Finally, we show that universal convex point sets with n points exist for 1-bend bichromatic point-set embeddings of 2-colored trees.",

author = "Fabrizio Frati and Marc Glisse and Lenhart, \{William J.\} and Giuseppe Liotta and Tamara Mchedlidze and Nishat, \{Rahnuma Islam\}",

year = "2013",

month = feb,

day = "26",

doi = "10.1007/978-3-642-36763-2\_26",

language = "English",

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series = "Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)",

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note = "20th International Symposium on Graph Drawing, GD 2012 ; Conference date: 19-09-2012 Through 21-09-2012",

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Frati, F, Glisse, M, Lenhart, WJ, Liotta, G, Mchedlidze, T & Nishat, RI 2013, Point-set embeddability of 2-colored trees. in Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers. Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), vol. 7704 LNCS, pp. 291-302, 20th International Symposium on Graph Drawing, GD 2012, Redmond, WA, United States, 19/09/12. https://doi.org/10.1007/978-3-642-36763-2_26

Point-set embeddability of 2-colored trees. / Frati, Fabrizio; Glisse, Marc; Lenhart, William J. et al.
Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers. 2013. p. 291-302 (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); Vol. 7704 LNCS).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

TY - GEN

T1 - Point-set embeddability of 2-colored trees

AU - Frati, Fabrizio

AU - Glisse, Marc

AU - Lenhart, William J.

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AU - Mchedlidze, Tamara

AU - Nishat, Rahnuma Islam

PY - 2013/2/26

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N2 - In this paper we study bichromatic point-set embeddings of 2-colored trees on 2-colored point sets, i.e., point-set embeddings of trees (whose vertices are colored red and blue) on point sets (whose points are colored red and blue) such that each red (blue) vertex is mapped to a red (resp. blue) point. We prove that deciding whether a given 2-colored tree admits a bichromatic point-set embedding on a given convex point set is an NP-complete problem; we also show that the same problem is linear-time solvable if the convex point set does not contain two consecutive points with the same color. Furthermore, we prove a 3n/2 - O(1) lower bound and a 2n upper bound (a 7n/6 - O(log n) lower bound and a 4n/3 upper bound) on the minimum size of a universal point set for straight-line bichromatic embeddings of 2-colored trees (resp. 2-colored binary trees). Finally, we show that universal convex point sets with n points exist for 1-bend bichromatic point-set embeddings of 2-colored trees.

AB - In this paper we study bichromatic point-set embeddings of 2-colored trees on 2-colored point sets, i.e., point-set embeddings of trees (whose vertices are colored red and blue) on point sets (whose points are colored red and blue) such that each red (blue) vertex is mapped to a red (resp. blue) point. We prove that deciding whether a given 2-colored tree admits a bichromatic point-set embedding on a given convex point set is an NP-complete problem; we also show that the same problem is linear-time solvable if the convex point set does not contain two consecutive points with the same color. Furthermore, we prove a 3n/2 - O(1) lower bound and a 2n upper bound (a 7n/6 - O(log n) lower bound and a 4n/3 upper bound) on the minimum size of a universal point set for straight-line bichromatic embeddings of 2-colored trees (resp. 2-colored binary trees). Finally, we show that universal convex point sets with n points exist for 1-bend bichromatic point-set embeddings of 2-colored trees.

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T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)

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BT - Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers

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ER -

Frati F, Glisse M, Lenhart WJ, Liotta G, Mchedlidze T, Nishat RI. Point-set embeddability of 2-colored trees. In Graph Drawing - 20th International Symposium, GD 2012, Revised Selected Papers. 2013. p. 291-302. (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)). doi: 10.1007/978-3-642-36763-2_26

Point-set embeddability of 2-colored trees

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