Galois Theory, Hopf Algebras, and Semiabelian Categories 2004
DOI: 10.1090/fic/043/05
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Crossed complexes and homotopy groupoids as non commutative tools for higher dimensional local-to-global problems

Abstract: We outline the main features of the definitions and applications of crossed complexes and cubical ω-groupoids with connections. These give forms of higher homotopy groupoids, and new views of basic algebraic topology and the cohomology of groups, with the ability to obtain some non commutative results and compute some homotopy types.

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Cited by 16 publications
(32 citation statements)
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“…We refer, for example to [1,2,5,8,9,15,14,20]. A natural generalisation of the concept of a crossed module is a crossed complex: Definition 2.10.…”
Section: Crossed Complexesmentioning
confidence: 99%
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“…We refer, for example to [1,2,5,8,9,15,14,20]. A natural generalisation of the concept of a crossed module is a crossed complex: Definition 2.10.…”
Section: Crossed Complexesmentioning
confidence: 99%
“…Crossed complexes are studied or used extensively in [1,2,5,8,10,11,12,13,14,38,39], for example. Notice that H.J.…”
Section: Blakers In [3]mentioning
confidence: 99%
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“…This is a crossed complex of free type, called the "Fundamental Crossed Complex of M "; see for example [5,6]. In particular, we have an action of the group π 1 (M 1 , * ) on all the other groups, preserving the boundary maps, and such that, if n > 2, then the action of π 1 …”
Section: Theorem 18 the Natural Morphism From The Free Crossed Modumentioning
confidence: 99%
“…Analogous ideas in the globular case present conceptual and technical difficulties. Multiple compositions allow easily an algebraic inverse to subdivision, and this is a key to certain local-to-global results, as outlined for example in [6]. However the algebraic relations between the cubical, globular, and (in the groupoid case) crossed complexes, are an essential part of the picture.…”
Section: Higher Dimensionsmentioning
confidence: 99%