arXiv:math/0404303 Abstract

arXiv:math/0404303 [math.AT]Abstract References Reviews Resources

Completions of pro-spaces

Published 2004-04-16Version 1

For every ring R, we present a pair of model structures on the category of pro-spaces. In the first, the weak equivalences are detected by cohomology with coefficients in R. In the second, the weak equivalences are detected by cohomology with coefficients in all R-modules (or equivalently by pro-homology with coefficients in R). In the second model structure, fibrant replacement is essentially just the Bousfield-Kan R-tower. When R = Z/p, the first homotopy category is equivalent to a homotopy theory defined by Morel but has some convenient categorical advantages.

Categories: math.AT

Subjects: 55P60, 55N10, 18G55, 55U35

Keywords: pro-spaces, completions, weak equivalences, coefficients, second model structure

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