Abstract
Abstract Porous materials, for example, metalnatural structures (MOFs) and their discrete partners metalnatural polyhedra (MOPs), that are built from coordinatively unsaturated inorganic hubs show incredible potential for application in gas adsorption/partition cycles, catalysis, and arising openings in hardware, optics, detecting, and biotechnology. A well-known hetero-bimetallic metalorganic polyhedra of this discrete partners metalnatural polyhedra (MOPs) class is cuboctahedral bi-metallic stricture. In this paper, we discuss the stricture of Hetero-bimetallic metalorganic polyhedra (cuboctahedral bi-metallic). Also, we computed the topological indices based on the degree of atoms in this cuboctahedral bi-metallic structure.
Highlights
Development of large molecules that are amiable to plan functionalization is of essential current interest as it speaks to a significant advance in the accomplishment of atomic complexity
The first and second Zagreb index is formulated by Gutman and Trinajsti (1972) and Gutman and Das (2004) as: Gutman and Trinajsti (1972) and Furtula and Gutman (2015) presented forgotten topological indices which was characterized as: (5)
We discuss the structure of Hetero-bimetallic metalorganic polyhedra
Summary
Development of large molecules that are amiable to plan functionalization is of essential current interest as it speaks to a significant advance in the accomplishment of atomic complexity. Single precious stones of huge particles are hard to get, blocking their full primary portrayal; second, plan of unbending substances that keep up their structure without visitors to take into consideration reversible admittance to the voids as compound functionalization of their voids and outside surface remains generally unexplored (Fujita et al, 1999) Given these difficulties and considering our ongoing work on metal-natural structures (MOFs), where we have illustrated the utilization of optional structure units (SBUs) as intends to the development of unbending organizations with perpetual porosity, we looked for to utilize the oar wheel group embraced by copper (II) acetic acid derivation, Cu2(CO2), as an unbending SBU for tending to these difficulties. Amic et al (1998) and Bollobás and Erds (1988) proposed the general Randic index as:
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