Vector coloring the categorical product of graphs
A vector t-coloring of a graph is an assignment of real vectors p1, … , pn to its vertices such that piTpi=t-1, for all i= 1 , … , n and piTpj≤-1, whenever i and j are adjacent. The vector chromatic number of G is the smallest number t≥ 1 for which a vector t-coloring of G exists. For a graph H and...
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sg-ntu-dr.10356-1428472023-02-28T19:46:52Z Vector coloring the categorical product of graphs Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios School of Physical and Mathematical Sciences Science::Mathematics Vector Coloring Lovász ϑ Number A vector t-coloring of a graph is an assignment of real vectors p1, … , pn to its vertices such that piTpi=t-1, for all i= 1 , … , n and piTpj≤-1, whenever i and j are adjacent. The vector chromatic number of G is the smallest number t≥ 1 for which a vector t-coloring of G exists. For a graph H and a vector t-coloring p1, … , pn of G, the map taking (i, ℓ) ∈ V(G) × V(H) to pi is a vector t-coloring of the categorical product G× H. It follows that the vector chromatic number of G× H is at most the minimum of the vector chromatic numbers of the factors. We prove that equality always holds, constituting a vector coloring analog of the famous Hedetniemi Conjecture from graph coloring. Furthermore, we prove necessary and sufficient conditions under which all optimal vector colorings of G× H are induced by optimal vector colorings of the factors. Our proofs rely on various semidefinite programming formulations of the vector chromatic number and a theory of optimal vector colorings we develop along the way, which is of independent interest. NRF (Natl Research Foundation, S’pore) Accepted version 2020-07-03T08:24:42Z 2020-07-03T08:24:42Z 2019 Journal Article Godsil, C., Roberson, D. E., Rooney, B., Šámal, R., & Varvitsiotis, A. (2020). Vector coloring the categorical product of graphs. Mathematical Programming, 182(1-2), 275-314. doi:10.1007/s10107-019-01393-0 0025-5610 https://hdl.handle.net/10356/142847 10.1007/s10107-019-01393-0 2-s2.0-85064644851 1-2 182 275 314 en Mathematical Programming © 2019 Springer-Verlag GmbH Germany, part of Springer Nature and Mathematical Optimization Society. This is a post-peer-review, pre-copyedit version of an article published in Mathematical Programming. The final authenticated version is available online at: http://dx.doi.org/10.1007/s10107-019-01393-0 application/pdf |
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Science::Mathematics Vector Coloring Lovász ϑ Number Godsil, Chris Roberson, David E. Rooney, Brendan Šámal, Robert Varvitsiotis, Antonios Vector coloring the categorical product of graphs |
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A vector t-coloring of a graph is an assignment of real vectors p1, … , pn to its vertices such that piTpi=t-1, for all i= 1 , … , n and piTpj≤-1, whenever i and j are adjacent. The vector chromatic number of G is the smallest number t≥ 1 for which a vector t-coloring of G exists. For a graph H and a vector t-coloring p1, … , pn of G, the map taking (i, ℓ) ∈ V(G) × V(H) to pi is a vector t-coloring of the categorical product G× H. It follows that the vector chromatic number of G× H is at most the minimum of the vector chromatic numbers of the factors. We prove that equality always holds, constituting a vector coloring analog of the famous Hedetniemi Conjecture from graph coloring. Furthermore, we prove necessary and sufficient conditions under which all optimal vector colorings of G× H are induced by optimal vector colorings of the factors. Our proofs rely on various semidefinite programming formulations of the vector chromatic number and a theory of optimal vector colorings we develop along the way, which is of independent interest. |
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School of Physical and Mathematical Sciences |
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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 |
| author_sort |
Godsil, Chris |
| title |
Vector coloring the categorical product of graphs |
| title_short |
Vector coloring the categorical product of graphs |
| title_full |
Vector coloring the categorical product of graphs |
| title_fullStr |
Vector coloring the categorical product of graphs |
| title_full_unstemmed |
Vector coloring the categorical product of graphs |
| title_sort |
vector coloring the categorical product of graphs |
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2020 |
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https://hdl.handle.net/10356/142847 |
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