Automorphisms and homotopies of groupoids and crossed modules

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Automorphisms and homotopies of groupoids and crossed modules. / Alp, Murat; Wensley, Christopher D.
In: Applied Categorical Structures, Vol. 18, No. 5, 10.2010, p. 473-504.

Research output: Contribution to journalArticlepeer-review

HarvardHarvard

Alp, M & Wensley, CD 2010, 'Automorphisms and homotopies of groupoids and crossed modules', Applied Categorical Structures, vol. 18, no. 5, pp. 473-504. https://doi.org/10.1007/s10485-008-9183-y

APA

Alp, M., & Wensley, C. D. (2010). Automorphisms and homotopies of groupoids and crossed modules. Applied Categorical Structures, 18(5), 473-504. https://doi.org/10.1007/s10485-008-9183-y

CBE

Alp M, Wensley CD. 2010. Automorphisms and homotopies of groupoids and crossed modules. Applied Categorical Structures. 18(5):473-504. https://doi.org/10.1007/s10485-008-9183-y

MLA

Alp, Murat and Christopher D. Wensley. "Automorphisms and homotopies of groupoids and crossed modules". Applied Categorical Structures. 2010, 18(5). 473-504. https://doi.org/10.1007/s10485-008-9183-y

VancouverVancouver

Alp M, Wensley CD. Automorphisms and homotopies of groupoids and crossed modules. Applied Categorical Structures. 2010 Oct;18(5):473-504. doi: 10.1007/s10485-008-9183-y

Author

Alp, Murat ; Wensley, Christopher D. / Automorphisms and homotopies of groupoids and crossed modules. In: Applied Categorical Structures. 2010 ; Vol. 18, No. 5. pp. 473-504.

RIS

TY - JOUR

T1 - Automorphisms and homotopies of groupoids and crossed modules

AU - Alp, Murat

AU - Wensley, Christopher D.

PY - 2010/10

Y1 - 2010/10

N2 - This paper is concerned with the algebraic structure of groupoids and crossed modules of groupoids. We describe the group structure of the automorphism group of a finite connected groupoid C as a quotient of a semidirect product. We pay particular attention to the conjugation automorphisms of C, and use these to define a new notion of groupoid action. We then show that the automorphism group of a crossed module of groupoids C, in the case when the range groupoid is connected and the source group totally disconnected, may be determined from that of the crossed module of groups Cu formed by restricting to a single object u. Finally, we show that the group of homotopies of C may be determined once the group of regular derivations of Cu is known.

AB - This paper is concerned with the algebraic structure of groupoids and crossed modules of groupoids. We describe the group structure of the automorphism group of a finite connected groupoid C as a quotient of a semidirect product. We pay particular attention to the conjugation automorphisms of C, and use these to define a new notion of groupoid action. We then show that the automorphism group of a crossed module of groupoids C, in the case when the range groupoid is connected and the source group totally disconnected, may be determined from that of the crossed module of groups Cu formed by restricting to a single object u. Finally, we show that the group of homotopies of C may be determined once the group of regular derivations of Cu is known.

KW - groupoidaction,crossedmodule,automorphism,section,homotopy

U2 - 10.1007/s10485-008-9183-y

DO - 10.1007/s10485-008-9183-y

M3 - Article

VL - 18

SP - 473

EP - 504

JO - Applied Categorical Structures

JF - Applied Categorical Structures

SN - 0927-2852

IS - 5

ER -