G. R. Vijayakumar scite author profile

Let G be a graph with ∆(G) > 1. It can be shown that the domination number of the graph obtained from G by subdividing every edge exactly once is more than that of G. So, let ξ(G) be the least number of edges such that subdividing each of these edges exactly once results in a graph whose domination number is more than that of G. The parameter ξ(G) is called the subdivision number of G. This notion has been introduced by S. Arumugam and S. Velammal. They have conjectured that for any graph G with ∆(G) > 1, ξ(G) ≤ 3. We show that the conjecture is false and construct for any positive integer n ≥ 3, a graph G of order n with ξ(G) > 1 3 log 2 n. The main results of this paper are the following: (i) For any connected graph G with at least three vertices, ξ(G) ≤ γ(G) + 1 where γ(G) is the domination number of G. (ii) If G is a connected graph of sufficiently large order n, then ξ(G) ≤ 4√ n ln n + 5.

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A Characterization of Signed Graphs Represented by Root System D℞

Chawathe¹,

Vijayakumar

1990

European Journal of Combinatorics

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On the uniqueness of D-vertex magic constant

Arumugam¹,

Kamatchi²,

Vijayakumar³

2014

Discuss. Math. Graph Theory

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G. R. Vijayakumar

Signed Graphs Represented by D∞

Distance Antimagic Labelings of Graphs

Effect of edge-subdivision on vertex-domination in a graph

A Characterization of Signed Graphs Represented by Root System D℞

On the uniqueness of D-vertex magic constant

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