2021-03-262013-01-010277786X1996756XWOS;000323425300002SCOPUS;2-s2.0-84881176425http://hdl.handle.net/10784/27418Objective: The topological complexity of contact networks in classrooms and the potential transmission of an infectious disease were analyzed by sex and age. Methods: The Tutte polynomials, some topological properties and the number of spanning trees were used to algebraically compute the topological complexity. Computations were made with the Maple package GraphTheory. Published data of mutually reported social contacts within a classroom taken from primary school, consisting of children in the age ranges of 4-5, 7-8 and 10-11, were used. Results: The algebraic complexity of the Tutte polynomial and the probability of disease transmission increases with age. The contact networks are not bipartite graphs, gender segregation was observed especially in younger children. Conclusion: Tutte polynomials are tools to understand the topology of the contact networks and to derive numerical indexes of such topologies. It is possible to establish relationships between the Tutte polynomial of a given contact network and the potential transmission of an infectious disease within such network. © 2013 SPIE.enghttps://v2.sherpa.ac.uk/id/publication/issn/0277-786Xinfo:eu-repo/semantics/conferencePaperComputational epidemiologiesComputer algebra softwaresContact networksNumber of spanning treesPotential transmissionsTopological complexityTopological propertiesTutte polynomialEnvironmental engineeringGraph theoryPolynomialsComplex networks2021-03-26Hincapié, D.Ospina, J.10.1117/12.2018078