Finite groups whose intersection power graphs are toroidal and projective-planar

Finite groups whose intersection power graphs are toroidal and projective-planar

The intersection power graph of a finite group GG is the graph whose vertex set is GG, and two distinct vertices xx and yy are adjacent if either one of xx and yy is the identity element of GG, or ⟨x⟩∩⟨y⟩\langle x\rangle \cap \langle y\rangle is non-trivial. In this paper, we completely classify al...

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Detalles Bibliográficos
Autores principales: Li Huani, Ma Xuanlong, Fu Ruiqin
Formato: article
Lenguaje:EN
Publicado: De Gruyter 2021
Materias:
intersection power graph
finite group
genus
05c25
05c10
Mathematics
QA1-939
Acceso en línea:https://doaj.org/article/3b33d0997ca442ac8997357f503c1c89
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Sumario:The intersection power graph of a finite group GG is the graph whose vertex set is GG, and two distinct vertices xx and yy are adjacent if either one of xx and yy is the identity element of GG, or ⟨x⟩∩⟨y⟩\langle x\rangle \cap \langle y\rangle is non-trivial. In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective-planar.

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