Higher orbifolds and deligne-mumford stacks as structured infinity-topoi
(eBook)

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Published
Providence, RI : American Mathematical Society, 2020.
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eBook
ISBN
9781470458102 (e-book)
Physical Desc
1 online resource (132 pages).
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Language
English

Notes

Bibliography
Includes bibliographical references.
Description
"We develop a universal framework to study smooth higher orbifolds on the one hand and higher Deligne-Mumford stacks (as well as their derived and spectral variants) on the other, and use this framework to obtain a completely categorical description of which stacks arise as the functor of points of such objects. We choose to model higher orbifolds and Deligne-Mumford stacks as infinity-topoi equipped with a structure sheaf, thus naturally generalizing the work of Lurie (2004), but our approach applies not only to different settings of algebraic geometry such as classical algebraic geometry, derived algebraic geometry, and the algebraic geometry of commutative ring spectra as in Lurie (2004), but also to differential topology, complex geometry, the theory of supermanifolds, derived manifolds etc., where it produces a theory of higher generalized orbifolds appropriate for these settings. This universal framework yields new insights into the general theory of Deligne-Mumford stacks and orbifolds, including a representability criterion which gives a categorical characterization of such generalized Deligne-Mumford stacks. This specializes to a new categorical description of classical Deligne-Mumford stacks, a result sketched in Carchedi (2019), which extends to derived and spectral Deligne-Mumford stacks as well"--,Provided by publisher.
Local note
Electronic reproduction. Ann Arbor, MI : ProQuest, 2018. Available via World Wide Web. Access may be limited to ProQuest affiliated libraries.

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Citations

APA Citation, 7th Edition (style guide)

Carchedi, D. J. (2020). Higher orbifolds and deligne-mumford stacks as structured infinity-topoi . American Mathematical Society.

Chicago / Turabian - Author Date Citation, 17th Edition (style guide)

Carchedi, David Joseph. 2020. Higher Orbifolds and Deligne-mumford Stacks As Structured Infinity-topoi. American Mathematical Society.

Chicago / Turabian - Humanities (Notes and Bibliography) Citation, 17th Edition (style guide)

Carchedi, David Joseph. Higher Orbifolds and Deligne-mumford Stacks As Structured Infinity-topoi American Mathematical Society, 2020.

MLA Citation, 9th Edition (style guide)

Carchedi, David Joseph. Higher Orbifolds and Deligne-mumford Stacks As Structured Infinity-topoi American Mathematical Society, 2020.

Note! Citations contain only title, author, edition, publisher, and year published. Citations should be used as a guideline and should be double checked for accuracy. Citation formats are based on standards as of August 2021.

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fd81833f-5695-e749-fa42-1f15bce5eece-eng
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Grouped Work IDfd81833f-5695-e749-fa42-1f15bce5eece-eng
Full titlehigher orbifolds and deligne mumford stacks as structured infinity topoi
Authorcarchedi david joseph
Grouping Categorybook
Last Update2023-03-28 17:50:03PM
Last Indexed2024-11-20 02:08:09AM

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4901 |a Memoirs of the American Mathematical Society,|x 0065-9266 ;|v Volume 264, Number 1282
504 |a Includes bibliographical references.
520 |a "We develop a universal framework to study smooth higher orbifolds on the one hand and higher Deligne-Mumford stacks (as well as their derived and spectral variants) on the other, and use this framework to obtain a completely categorical description of which stacks arise as the functor of points of such objects. We choose to model higher orbifolds and Deligne-Mumford stacks as infinity-topoi equipped with a structure sheaf, thus naturally generalizing the work of Lurie (2004), but our approach applies not only to different settings of algebraic geometry such as classical algebraic geometry, derived algebraic geometry, and the algebraic geometry of commutative ring spectra as in Lurie (2004), but also to differential topology, complex geometry, the theory of supermanifolds, derived manifolds etc., where it produces a theory of higher generalized orbifolds appropriate for these settings. This universal framework yields new insights into the general theory of Deligne-Mumford stacks and orbifolds, including a representability criterion which gives a categorical characterization of such generalized Deligne-Mumford stacks. This specializes to a new categorical description of classical Deligne-Mumford stacks, a result sketched in Carchedi (2019), which extends to derived and spectral Deligne-Mumford stacks as well"--|c Provided by publisher.
588 |a Description based on print version record.
590 |a Electronic reproduction. Ann Arbor, MI : ProQuest, 2018. Available via World Wide Web. Access may be limited to ProQuest affiliated libraries.
650 7|a Algebraic geometry -- Families, fibrations -- Stacks and moduli problems.|2 msc
650 0|a Toposes.
650 0|a Orbifolds.
650 0|a Categories (Mathematics)
655 4|a Electronic books.
77608|i Print version:|a Carchedi, David Joseph.|t Higher orbifolds and deligne-mumford stacks as structured infinity-topoi.|d Providence, Rhode Island ; American Mathematical Society [2020]|h 132 pages |z 9781470441449 |w (DLC) 2020024075
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830 0|a Memoirs of the American Mathematical Society ;|v Volume 264, Number 1282.
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