Locating any two vertices on Hamiltonian cycles
Abstract
In this paper we give a proof of Enomoto's conjecture for graphs of sufficiently large order. Enomoto's conjecture states that, if G is a graph of order n with minimum degree δ(G)≥ n2+1, then for any pair of vertices x, y in G, there is a Hamiltonian cycle C of G such that dC(x,y)= n2. The main tools of our proof are Regularity Lemma of Szemer\'edi and Blow-up Lemma of Koml\'os et al.
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