Classifying Spaces for Monoidal Categories Through Geometric Nerves

Autores: Manuel Bullejos Lorenzo , Antonio M. Cegarra
Localización: Canadian mathematical bulletin, ISSN 0008-4395, Vol. 47, Nº 3, 2004, págs. 321-331
Idioma: inglés
DOI: 10.4153/cmb-2004-031-8
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Resumen
- The usual constructions of classifying spaces for monoidal categories produce CW-complexes with many cells that, moreover, do not have any proper geometric meaning. However, geometric nerves of monoidal categories are very handy simplicial sets whose simplices have a pleasing geometric description: they are diagrams with the shape of the 2-skeleton of oriented standard simplices. The purpose of this paper is to prove that geometric realizations of geometric nerves are classifying spaces for monoidal categories.