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Title:

Categorical constructions in graph theory

Description:

This paper presents some graph-theoretic questions from the viewpoint of the portion of category theory which has become common knowledge. In particular, the reader is encouraged to consider whether there is only one natural category of graphs and how theories of directed graphs and undirected graphs are related.

This paper presents some graph-theoretic questions from the viewpoint of the portion of category theory which has become common knowledge. In particular, the reader is encouraged to consider whether there is only one natural category of graphs and how theories of directed graphs and undirected graphs are related. Minimize

Publisher:

Hindawi Publishing Corporation

Year of Publication:

1986-03-01T00:00:00Z

Document Type:

article

Language:

English

Subjects:

category of graphs ; algebraic structure. ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics...

category of graphs ; algebraic structure. ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Mathematics ; DOAJ:Mathematics and Statistics ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q Minimize

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http://dx.doi.org/10.1155/S0161171286000017

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Title:

Categorical constructions in graph theory

Description:

This paper presents some graph-theoretic questions from the viewpoint of the portion of category theory which has become common knowledge. In particular, the reader is encouraged to consider whether there is only one natural category of graphs and how theories of directed graphs and undirected graphs are related.

This paper presents some graph-theoretic questions from the viewpoint of the portion of category theory which has become common knowledge. In particular, the reader is encouraged to consider whether there is only one natural category of graphs and how theories of directed graphs and undirected graphs are related. Minimize

Publisher:

Hindawi Publishing Corporation

Year of Publication:

1986

Language:

en

Rights:

Copyright © 1986 Hindawi Publishing Corporation.

Copyright © 1986 Hindawi Publishing Corporation. Minimize

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Title:

The connection between the fundamental groupoid and a unification algorithm for syntactil algebras (extended abstract)

Year of Publication:

1991

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Title:

A uniqueness theorem for homology in $\cal C$at, the category of small categories

Publisher:

American Mathematical Society

Year of Publication:

1975-03

Document Type:

Text

Language:

en

Subjects:

55B40 ; 18G30 ; 18G10

55B40 ; 18G30 ; 18G10 Minimize

Rights:

Copyright 1975 American Mathematical Society

Copyright 1975 American Mathematical Society Minimize

Relations:

0002-9904 ; 1936-881X

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Title:

Homotopy inverses for nerve (Research announcement)

Year of Publication:

1979-01-01

Document Type:

doc-type:article ; Artikel ; NonPeerReviewed

Subjects:

Mathematik ; Informatik und Statistik ; ddc:510

Mathematik ; Informatik und Statistik ; ddc:510 Minimize

Relations:

http://epub.ub.uni-muenchen.de/4626/1/68.pdf ; Fritsch, Rudolf und Latch, Dana May (1979): Homotopy inverses for nerve (Research announcement). In: Bulletin of the American Mathematical Society, Nr. 1: S. 258-262

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Title:

Homotopy inverses for nerve

Year of Publication:

1981-01-01

Document Type:

doc-type:article ; Artikel ; NonPeerReviewed

Subjects:

Mathematik ; Informatik und Statistik ; ddc:510

Mathematik ; Informatik und Statistik ; ddc:510 Minimize

Relations:

http://epub.ub.uni-muenchen.de/4512/1/22.pdf ; Fritsch, Rudolf und Latch, Dana May (1981): Homotopy inverses for nerve. In: Mathematische Zeitschrift, Nr. 177: S. 147-179

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Title:

Homotopy inverses for nerve

Publisher:

American Mathematical Society

Year of Publication:

1979-01

Document Type:

Text

Language:

en

Subjects:

55D10 ; 18A40 ; 55D50 ; 55J10 ; 18G30 ; 55F35

55D10 ; 18A40 ; 55D50 ; 55J10 ; 18G30 ; 55F35 Minimize

Rights:

Copyright 1979 American Mathematical Society

Copyright 1979 American Mathematical Society Minimize

Relations:

0273-0979 ; 1088-9485

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