Role coloring of graphs from rooted products

Role coloring of graphs from rooted products

A k-role coloring is an assignment of k colors to the vertices of a graph such that if any two vertices receive the same color, then the set of colors assigned to their neigh­borhood will also be the same. Any graph with n vertices can have n-role coloring. Although it is easy to determine whether a...

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Библиографическая информация
Опубликовано в: :Прикладная дискретная математика № 68. С. 94-102
Главный автор: Komathi, M.
Другие авторы: Ragukumar, P.
Формат: Статья в журнале
Язык:English
Предметы:
ролевая раскраска
ролевые графы
корневое произведение графов
бинарное произведение
статьи в журналах
Online-ссылка:https://vital.lib.tsu.ru/vital/access/manager/Repository/koha:001159473
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Итог:A k-role coloring is an assignment of k colors to the vertices of a graph such that if any two vertices receive the same color, then the set of colors assigned to their neigh­borhood will also be the same. Any graph with n vertices can have n-role coloring. Although it is easy to determine whether a graph with n vertices accepts a 1-role coloring, the challenge of k-role coloring is known to be difficult for k > 2. In fact, k-role coloring is known to be NP-complete for k > 2 on general graphs. In this paper, we determine k-role coloring of the rooted product of various graphs.
Библиография:Библиогр.: 12 назв.
ISSN:2071-0410

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