APA 6th Edition Diudea, M.V., Stefu, M., John, P.E. i Graovac, A. (2006). Generalized Operations on Maps. Croatica Chemica Acta, 79 (3), 355-362. Preuzeto s https://hrcak.srce.hr/5627
MLA 8th Edition Diudea, Mircea V., et al. "Generalized Operations on Maps." Croatica Chemica Acta, vol. 79, br. 3, 2006, str. 355-362. https://hrcak.srce.hr/5627. Citirano 08.03.2021.
Chicago 17th Edition Diudea, Mircea V., Monica Stefu, Peter E. John i Ante Graovac. "Generalized Operations on Maps." Croatica Chemica Acta 79, br. 3 (2006): 355-362. https://hrcak.srce.hr/5627
Harvard Diudea, M.V., et al. (2006). 'Generalized Operations on Maps', Croatica Chemica Acta, 79(3), str. 355-362. Preuzeto s: https://hrcak.srce.hr/5627 (Datum pristupa: 08.03.2021.)
Vancouver Diudea MV, Stefu M, John PE, Graovac A. Generalized Operations on Maps. Croatica Chemica Acta [Internet]. 2006 [pristupljeno 08.03.2021.];79(3):355-362. Dostupno na: https://hrcak.srce.hr/5627
IEEE M.V. Diudea, M. Stefu, P.E. John i A. Graovac, "Generalized Operations on Maps", Croatica Chemica Acta, vol.79, br. 3, str. 355-362, 2006. [Online]. Dostupno na: https://hrcak.srce.hr/5627. [Citirano: 08.03.2021.]
Sažetak A map M is a combinatorial representation of a closed surface. Convex polyhedra, starting from the Platonic solids and going to spherical fullerenes, can be operated to obtain new objects, with a larger number of vertices and various tiling. Three composite map operations: leapfrog, chamfering and capra, play a central role in the fullerenes construction and their electronic properties. Generalization of the above operations leads to a series of transformations, characterized by distinct, successive pairs in the Goldberg multiplication formula m(a,b). Parents and products of most representative operations are illustrated.