Conformers of [M(ABC)6] complex have been enumerated on the basis of computational group theory, where M is the central metal, and ABC is the ligand, bound to M through A. Based on the 16 conformers of the M(AB)6 core unit, 7173 conformers have been found for the [M(ABC)6] complex, which are assigned to nine point groups, 1 D3d, 4 D3, 4 S6, 5 C2h, 7 C3, 182 C2, 15 Cs, 23 Ci, and 6932 C1.
Sakiyama, H., & Waki, K. (2016). Enumeration of Conformers of Octahedral [M(ABC)_{6}] Complex on the Basis of Computational Group Theory. Iranian Journal of Mathematical Chemistry, 7(2), 223-234. doi: 10.22052/ijmc.2016.13926
MLA
H. Sakiyama; K. Waki. "Enumeration of Conformers of Octahedral [M(ABC)_{6}] Complex on the Basis of Computational Group Theory", Iranian Journal of Mathematical Chemistry, 7, 2, 2016, 223-234. doi: 10.22052/ijmc.2016.13926
HARVARD
Sakiyama, H., Waki, K. (2016). 'Enumeration of Conformers of Octahedral [M(ABC)_{6}] Complex on the Basis of Computational Group Theory', Iranian Journal of Mathematical Chemistry, 7(2), pp. 223-234. doi: 10.22052/ijmc.2016.13926
VANCOUVER
Sakiyama, H., Waki, K. Enumeration of Conformers of Octahedral [M(ABC)_{6}] Complex on the Basis of Computational Group Theory. Iranian Journal of Mathematical Chemistry, 2016; 7(2): 223-234. doi: 10.22052/ijmc.2016.13926
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