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http://ri.uaemex.mx/handle20.500.11799/99274| Title: | The second symmetric product of finite graphs from a homotopical viewpoint | Keywords: | Hyperspaces;symmetric product;Fi nite graph;homotopy;info:eu-repo/classification/cti/1 | Publisher: | Khayyam Journal of Mathematics | Project: | 4;1 | Description: | This paper describes the classi cation of the n-fold symmetric product of a finite graph by means of its homotopy type. This paper describes the classi cation of the n-fold symmetric product of a finite graph by means of its homotopy type, having as universal models the n-fold symmetric product of the wedge of n-circles; and introduces a CW-complex called binomial torus, which is homeomorphic to a space that is a strong deformation retract of the second symmetric products of the wedge of n-circles. Applying the above we calculate the fundamental group, Euler characteristic, homology and cohomology groups of the second symmetric product of finite graphs. |
URI: | http://ri.uaemex.mx/handle20.500.11799/99274 | Other Identifiers: | http://hdl.handle.net/20.500.11799/99274 | Rights: | info:eu-repo/semantics/openAccess http://creativecommons.org/licenses/by-nc-nd/4.0 |
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