Elementary categories, elementary toposes
著者
書誌事項
Elementary categories, elementary toposes
(Oxford logic guides, 21)
Clarendon Press, 1992
大学図書館所蔵 全22件
注記
Includes bibliographical references and index
内容説明・目次
内容説明
The book covers elementary aspects of category theory and topos theory. It has few mathematical prerequisites, and uses categorical methods throughout rather than beginning with set theoretic foundations. It works with key notions such as Cartesian closedness, adjunctions, regular categories, and the internal logic of a topos. Full statements and elementary proofs are given for the central theorems, including the fundamental theorem of toposes, the sheafification theorem, and the construction of Grothendieck toposes over any topos as base. Three chapters discuss applications of toposes in detail, namely to sets, to basic differential geometry, and to recursive analysis.
目次
- Part I Categories: Rudimentary structures in a category
- Products, equalizers, and their duals
- Groups
- Sub-objects, pullbacks, and limits
- Relations
- Cartesian closed categories
- Product operators and others
- Part II The category of categories: Functors and categories
- Natural transformations
- Adjunctions
- Slice categories
- Mathematical foundations
- Part III Toposes: Basics
- The internal language
- A soundness proof for topos logic
- From the internal language to the topos
- The fundamental theorem
- External semantics
- Natural number objects
- Categories in a topos
- Topologies
- Part IV Some toposes: Sets
- Synthetic differential geometry
- The effective topos
- Relations in regular categories.
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