On the generation of minimal graph extensions by the method of canonical representatives | Applied Discrete Mathematics. Supplement. 2019. № 12. DOI: 10.17223/2226308X/12/50

On the generation of minimal graph extensions by the method of canonical representatives

A graph G* is a k-vertex (edge) extension of a graph G if every graph obtained by removing any k vertices (edges) from G* contains G. A k-vertex (edge) extension G* of graph G is said to be minimal if it contains minimum possible vertices and has the minimum number of edges among all k-vertex (edge) extension of graph G. The paper proposes an algorithm for generating all non-isomorphic minimal vertex (edge) k-extensions of a given graph with isomorphism rejection technique by using method of generating canonical representatives.

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Keywords

отказоустойчивость, расширение графа, изоморфизм, канонический код, метод канонических представителей, fault tolerance, graph extension, isomorphism, canonical code, generating canonical representatives

Authors

Name	Organization	E-mail
Kamil I.A.K.	Saratov State University	kamil.iehab@mail.ru
Sudani H.H.K.	Saratov State University	hayder.1977@mail.ru
Lobov A. A.	Saratov State University	aisanekai@mail.ru
Abrosimov M.B.	Saratov State University	mic@rambler.ru

Всего: 4

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