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ACS
2007
2007
Components of the Fundamental Category II
In this article we carry on the study of the fundamental category (Goubault and Raussen, 2002; Goubault, 2003) of a partially ordered topological space (Nachbin, 1965; Johnstone, 1982), as arising in e.g. concurrency theory (Fajstrup et al., 2006), initiated in (Fajstrup et al., 2004). The “algebra” of dipaths modulo dihomotopy (the fundamental category) of such a po-space is essentially finite in a number of situations. We give new definitions of the component category that are more tractable than the one of (Fajstrup et al., 2004), as well as give definitions of future and past component categories, related to the past and future models of (Grandis, 2005). The component category is defined as a category of fractions, but it can be shown to be equivalent to a quotient category, much easier to portray. A van Kampen theorem is known to be available on fundamental categories (Grandis, 2003; Goubault, 2003), we show in this paper a similar theorem for component categories (conject...
Real-time TrafficACS 2007 | Component Category | Distributed And Parallel Computing | Fajstrup Et | Fundamental Category |
| Added | 08 Dec 2010 |
| Updated | 08 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | ACS |
| Authors | Eric Goubault, Emmanuel Haucourt |
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