![]() ![]() Funk, et al., Early dynamics of transmission and control of COVID-19: A mathematical modelling study, Lancet Infect. Ramos, Mathematical modeling of the spread of the coronavirus disease 2019 (COVID-19) considering its particular characteristics. Farahani, et al., The COVID-19 infection diffusion in the US and Japan: A graph-theoretical approach, Biology, 11 (2022), 125. Robertson, et al., How simulation modelling can help reduce the impact of COVID-19, J. AiM Integrations Purchase Order Functional Description The University of Connecticut’s (UConn’s) Facilities Operations and Building Services (FOBS) organization selected AiM, an Integrated Workplace Management Solution (IWMS) provided by AssetWorks, as the software to manage Operations and Maintenance (O&M). Šajna, Connection and separation in hypergraph, Theory Appl. Lee, Paths and cycles of hypergraphs, Sci. Ndiaye, On the notion of cycles in hypergraphs, Descrete Math., 309 (2009), 6535–6543. Kannan, Hyper paths and hyper cycles, Int. West, Introduction to Graph Theory, Prentice Hall, 1996. Voloshin, Introduction to Graph and Hypergraph, New York: Nova Science Publishers, 2013.ĭ. Bretto, Hypergraph Theory: An Introduction, Cham: Springer, 2013. Berge, Graphs and Hypergraphs, Amsterdam: North Holland, 1973.Ī. de Kergorlay, Epidemics on hypergraphs: Spectral thresholds for extinction, Proc. Moreno, Social contagion models on hypergraphs, Phys. We are a fully licensed and insured property management. Atangana, Modeling the dynamics of novel coronavirus (2019-nCov) with fractional derivative, Alex. AIM Properties We charge a 10 property management fee which is one of the lowest in Albuquerque. Dhotre, Virus graph and COVID-19 pandemic: A graph theory approach, In: Big Data Analytics and Artificial Intelligence Against COVID-19: Innovation Vision and Approach, Cham: Springer, 2020. Yusifov, Graph modelling for tracking the COVID-19 pandemic spread, Infect. ![]() Cristea, Knots and knot-hyperpaths in hypergraphs, Mathematics, 10 (2022). Molluzzo, The strength of a graph and its application to organizational structure, Soc. On knot separability of hypergraphs and its application towards infectious disease management. separable and non-separable hypergraph,Ĭitation: Raju Doley, Saifur Rahman, Gayatri Das.Lastly, a model of a hypergraph is constructed to control the spread of infection for an infectious disease with the help of the strength of knots. An algorithm is modelled to construct a tree and hypertree from the strength of knots of a hypertree. Cyclic hypergraph is defined in terms of a permutation on the set of hyperedges and could be an interesting topic for investigation in the sense that it can be linked with the notion of a permutation group. We also introduce the concept of hypercycle in terms of knot hyperpath and establish a sufficient condition for a hypergraph to be a hypertree in terms of the strength of knots. We introduce the concept of cut knot and investigate its importance in the connectivity of hypergraphs. The strength of knots is defined and investigates some of their properties. The article deals with some theoretical aspects of hypergraph connectivity from the knot view. ![]()
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