Genus of total graphs from rings: A survey

Let V be an n-dimensional vector space over the field F with a basis B = {α 1 , . . . , α n }. For a non-zero vector v ∈ V \ {0}, the skeleton of v with respect to the basis B is definedwith respect to B is the simple graph with vertex set V = V \ {0} and two distinct non-zero vectors u, v ∈ V are adjacent if and only if S B (u) ∪ S B (v) = B. First, we obtain some graph theoretical properties of Γ(V B ). Further, we characterize all finite dimensional vector spaces V for which Γ(V B ) has genus either 0 or 1 or 2. In the last part of the paper, we characterize all finite dimensional vector spaces V for which the cross cap of Γ(V B ) is 1.

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On the genus of non-zero component union graphs of vector spaces

Kalaimurugan

Gopinath

Chelvam

2021

Hacettepe Journal of Mathematics and Statistics

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Genus of total graphs from rings: A survey

Abstract: Let R be a commutative ring. The total graph T Γ (R) of R is the undirected graph with vertex set R and two distinct vertices x and y are adjacent if x + y is a zero divisor in R. In this paper, we present a survey of results on the genus of T Γ (R) and three of its generalizations. c

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On the genus of non-zero component union graphs of vector spaces

On the genus of non-zero component union graphs of vector spaces

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