Graph homomorphisms via vector colorings
In this paper we study the existence of homomorphisms G→H using semidefinite programming. Specifically, we use the vector chromatic number of a graph, defined as the smallest real number t≥2 for which there exists an assignment of unit vectors i↦p i to its vertices such that 〈p i ,p j 〉≤−1∕(t−1), wh...
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sg-ntu-dr.10356-1430532023-02-28T19:50:02Z Graph homomorphisms via vector colorings Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios School of Physical and Mathematical Sciences Science::Mathematics In this paper we study the existence of homomorphisms G→H using semidefinite programming. Specifically, we use the vector chromatic number of a graph, defined as the smallest real number t≥2 for which there exists an assignment of unit vectors i↦p i to its vertices such that 〈p i ,p j 〉≤−1∕(t−1), when i∼j. Our approach allows to reprove, without using the Erdős–Ko–Rado Theorem, that for n>2r the Kneser graph K n:r and the q-Kneser graph qK n:r are cores, and furthermore, that for n∕r=n ′ ∕r ′ there exists a homomorphism K n:r →K n ′ :r ′ if and only if n divides n ′ . In terms of new applications, we show that the even-weight component of the distance k-graph of the n-cube H n,k is a core and also, that non-bipartite Taylor graphs are cores. Additionally, we give a necessary and sufficient condition for the existence of homomorphisms H n,k →H n ′ ,k ′ when n∕k=n ′ ∕k ′ . Lastly, we show that if a 2-walk-regular graph (which is non-bipartite and not complete multipartite)has a unique optimal vector coloring, it is a core. Based on this sufficient condition we conducted a computational study on Ted Spence's list of strongly regular graphs (http://www.maths.gla.ac.uk/ es/srgraphs.php)and found that at least 84% are cores. Accepted version 2020-07-23T06:34:50Z 2020-07-23T06:34:50Z 2019 Journal Article Godsil, C., Roberson, D. E., Rooney, B., Šámal, R., & Varvitsiotis, A. (2019). Graph homomorphisms via vector colorings. European Journal of Combinatorics, 79, 244-261. doi:10.1016/j.ejc.2019.04.001 0195-6698 https://hdl.handle.net/10356/143053 10.1016/j.ejc.2019.04.001 2-s2.0-85064764263 79 244 261 en European Journal of Combinatorics © 2019 Elsevier Ltd. All rights reserved. This paper was published in European Journal of Combinatorics and is made available with permission of Elsevier Ltd. application/pdf |
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Science::Mathematics Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios Graph homomorphisms via vector colorings |
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In this paper we study the existence of homomorphisms G→H using semidefinite programming. Specifically, we use the vector chromatic number of a graph, defined as the smallest real number t≥2 for which there exists an assignment of unit vectors i↦p i to its vertices such that 〈p i ,p j 〉≤−1∕(t−1), when i∼j. Our approach allows to reprove, without using the Erdős–Ko–Rado Theorem, that for n>2r the Kneser graph K n:r and the q-Kneser graph qK n:r are cores, and furthermore, that for n∕r=n ′ ∕r ′ there exists a homomorphism K n:r →K n ′ :r ′ if and only if n divides n ′ . In terms of new applications, we show that the even-weight component of the distance k-graph of the n-cube H n,k is a core and also, that non-bipartite Taylor graphs are cores. Additionally, we give a necessary and sufficient condition for the existence of homomorphisms H n,k →H n ′ ,k ′ when n∕k=n ′ ∕k ′ . Lastly, we show that if a 2-walk-regular graph (which is non-bipartite and not complete multipartite)has a unique optimal vector coloring, it is a core. Based on this sufficient condition we conducted a computational study on Ted Spence's list of strongly regular graphs (http://www.maths.gla.ac.uk/ es/srgraphs.php)and found that at least 84% are cores. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios |
| format |
Article |
| author |
Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios |
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Godsil, Chris |
| title |
Graph homomorphisms via vector colorings |
| title_short |
Graph homomorphisms via vector colorings |
| title_full |
Graph homomorphisms via vector colorings |
| title_fullStr |
Graph homomorphisms via vector colorings |
| title_full_unstemmed |
Graph homomorphisms via vector colorings |
| title_sort |
graph homomorphisms via vector colorings |
| publishDate |
2020 |
| url |
https://hdl.handle.net/10356/143053 |
| _version_ |
1759858120355479552 |