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doi:10.1016/S0166-218X(98)00149-8 
Copyright © 1999 Published by Elsevier Science B.V.
Hamiltonicity in 3-domination-critical graphs with α = δ + 2*1
Received 6 March 1997;
revised 17 November 1997;
accepted 10 August 1998. ;
Available online 30 June 1999.
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Abstract
Let δ, γ, and α be respectively the minimum degree, the domination number and the independence number of a graph G. The graph G is 3-γ-critical if γ = 3 and the addition of any edge decreases γ by 1. It was conjectured that any connected 3-γ-critical graph with δ 
2 is hamiltonian. In Fararon et al. (J. Graph Theory, 25 (1997) 173–184.) it was proved α 
δ + 2; and moreover, if α δ + 1, then G is hamiltonian. Here we show that if α = δ + 2 then G is hamiltonian, and thus prove the conjecture. We also give a class of 3-γ-critical graphs with α = δ + 2.
Author Keywords: Domination-critical graphs; Hamiltonicity; Longest cycle
