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Fan is to monoid as scheme is to ring: a generalization of the notion of a fan | Howard M Thompson
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13 Jun 2003 | Subject: | Algebraic Geometry MSC-class: 14M25 | math.AG | Affiliation: | University of Michigan | Abstract: | Following DeMeyer, Ford & Miranda [DFM93], we define a topology on a fan by declaring open sets to be its subfans. Then, like Kato [Kat94], we make our fans into monoided spaces by associating a sheaf of monoids to each fan. (Our sheaf of monoids differs from Kato’s.) Observing that this new monoided space is locally isomorphic to the spectrum of some monoid in the same sort of way a scheme is locally isomorphic to the spectrum of some ring, we define any monoided space that is locally isomorphic to the spectra of monoids to be a (generalized) fan. The monoid algebra functor can then be used to associate a scheme to such a fan. If we use the monoid algebra functor over some base field k, the resultant scheme is a normal variety if and only if it is a toric variety. | Source: | arXiv, math.AG/0306221 | Services: | Forum | Review | PDF | Favorites |
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