B. I. Niel, W. A. Reartes and N. B. Brignole, “Every Longest Hamiltonian Path in Odd Nodd-Gons,” SIAM Conference on Discrete Mathematics, Austin, 14-17 June 2010, p. 42.
has been cited by the following article:
TITLE: Longest Hamiltonian in Nodd-Gon
AUTHORS: Blanca I. Niel
KEYWORDS: Hamiltonian Path; Extremal Problems; Euclidean Geometric Problem; Farthest Neighbor Tours; Traveling Salesman Problem; Geometry of Odd Regular Polygons
JOURNAL NAME: Open Journal of Discrete Mathematics, Vol.3 No.2, April 24, 2013
ABSTRACT: We single out the polygonal paths of nodd -1 order that solve each of the different longest non-cyclic Euclidean Hamiltonian path problems in networks by an arithmetic algorithm. As by product, the procedure determines the winding index of cyclic Hamiltonian polygonals on the vertices of a regular polygon.