2017
DOI: 10.48550/arxiv.1711.02640
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Augmented Homotopical Algebraic Geometry

Abstract: We develop the framework for augmented homotopical algebraic geometry. This is an extension of homotopical algebraic geometry, which itself is a homotopification of classical algebraic geometry. To do so, we define the notion of augmentation categories, which are a special class of generalised Reedy categories. For an augmentation category, we prove the existence of a closed Quillen model structure on the presheaf category which is compatible with the Kan-Quillen model structure on simplicial sets. Moreover, w… Show more

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“…Remark 5.4. Other generalisations of higher stacks exist by taking more structured objects than simplicial sets as the foundation; for details see [Bal17].…”
Section: Definitionsmentioning
confidence: 99%
“…Remark 5.4. Other generalisations of higher stacks exist by taking more structured objects than simplicial sets as the foundation; for details see [Bal17].…”
Section: Definitionsmentioning
confidence: 99%