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Line 1: {{Multiple issues\| In [[mathematics]], in the theory of [[sheaf (mathematics)\|sheaves]] the '''direct image with compact (or proper) support''' is an [[image (mathematics)\|image]] [[functor]] for sheaves. It is one of [[Alexander Grothendieck \| Grothendieck's]] [[six operations]]. ▼ {{context\|date=May 2025}} {{technical\|date=May 2025}} }} ▲In [[mathematics]], ~~in the theory of [[sheaf (mathematics)\|sheaves]]~~ the '''direct image with compact (or proper) support''' is an [[Image functors for sheaves\|image functor]] for [[Sheaf (mathematics)\|~~image~~sheaves]] that extends the [[compactly supported]] [[global sections functor]] ~~for~~to ~~sheaves~~the relative setting. It is one of [[Alexander Grothendieck \| Grothendieck's]] [[six operations]]. ==Definition== {{Images of sheaves}} Let ''<math>f'': ''X''\to ~~→ ''~~Y''</math> be a [[continuous mapping]] of [[locally compact]] [[Hausdorff space\|Hausdorff]] [[topological space]]s, and let <math>\mathrm{Sh}(–-)</math> denote the [[category (mathematics)\|category]] of sheaves of [[abelian group]]s on a topological space. The '''direct image with compact (or proper) [[support (mathematics)\|support]]''' is the [[functor]] :~~''f''~~<~~sub~~math>f_{!~~</sub>~~}: \mathrm{Sh}(''X'')\to ~~→~~ \mathrm{Sh}(''Y'')</math> that sends a sheaf ''<math>\mathcal{F''}</math> on ''<math>X''</math> to ~~''f''~~the sheaf <~~sub~~math>f_{!~~</sub>~~}(''\mathcal{F''})</math> ~~defined~~given by the formula :~~''f''~~<~~sub~~math>f_{!~~</sub>~~}(''\mathcal{F''})(''U'') := \{''s~~'' ∈ ''~~\in\mathcal{F''}(''f~~''<sup> −~~^{-1~~</sup>~~}(''U'')) \|\mid {f~~\|<sub>~~\vert}_{\operatorname{supp}(''s'')~~</sub>~~}: ~~[[support (mathematics)\|~~\operatorname{supp]]}(''s'')~~ → ''~~\to U'' \text{ is [[proper ~~map\|proper]]~~},\}</math> for every open subset <math>U</math> of <math>Y</math>. Here, the notion of a [[proper map]] of spaces is unambiguous since the spaces in question are locally compact Hausdorff.<ref>{{Cite web \|title=Section 5.17 (005M): Characterizing proper maps—The Stacks project \|url=https://stacks.math.columbia.edu/tag/005M \|access-date=2022-09-25 \|website=stacks.math.columbia.edu}}</ref> This defines <math>f_{!}(\mathcal{F})</math> as a subsheaf of the [[Direct image functor\|direct image]] sheaf <math>f_(\mathcal{F})</math> and the functoriality of this construction then follows from basic properties of the support and the definition of sheaves. ~~where ''U'' is an open subset of ''Y''. The functoriality of this construction follows from the very basic properties of the support and the definition of sheaves.~~ The assumption that the spaces be locally compact Hausdorff is imposed in most sources (e.g., Iversen or Kashiwara–Schapira). In slightly greater generality, Olaf Schnürer and [[Wolfgang Soergel]] have introduced the notion of a "locally proper" map of spaces and shown that the functor of direct image with compact support remains well-behaved when defined for separated and locally proper continuous maps between arbitrary spaces.<ref>{{Cite journal \|last=Schnürer \|first=Olaf M. \|last2=Soergel \|first2=Wolfgang \|date=2016-05-19 \|title=Proper base change for separated locally proper maps \|url=https://ems.press/journals/rsmup/articles/13889 \|journal=Rendiconti del Seminario Matematico della Università di Padova \|language=en \|volume=135 \|pages=223–250 \|doi=10.4171/rsmup/135-13 \|issn=0041-8994\|arxiv=1404.7630 }}</ref> ==Properties== ~~If ''f'' is proper, then ''f''<sub>!</sub> equals ''f''<sub>∗</sub>. In general, ''f''<sub>!</sub>(''F'') is only a subsheaf of ''f''<sub>∗</sub>(''F'')~~ If <math>f</math> is proper, then <math>f_!</math> equals <math>f_</math>. If <math>f</math> is an open [[embedding]], then <math>f_!</math> identifies with the extension by zero functor.<ref>{{Cite web \|title=general topology - Proper direct image and extension by zero \|url=https://math.stackexchange.com/q/2768645 \|access-date=2022-09-25 \|website=Mathematics Stack Exchange \|language=en}}</ref> ==References== {{reflist}} * {{Citation \| last1=Iversen \| first1=Birger \| title=Cohomology of sheaves \| publisher=[[Springer-Verlag]] \| ___location=Berlin, New York \| series=Universitext \| isbn=978-3-540-16389-3 \| mr=842190 \| year=1986}}, esp. section VII.1 [[Category:Sheaf theory]] [[Category:~~Continuous~~Theory ~~mappings~~of continuous functions]] [[Category:Functors]]