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In mathematics, R-algebroids are constructed starting from groupoids. These are more abstract concepts than the Lie algebroids that play a similar role in the theory of Lie groupoids to that of Lie algebras in the theory of Lie groups. (Thus, a Lie algebroid can be thought of as 'a Lie algebra with many objects ').

Definition

An R-algebroid, ${\displaystyle R{\mathsf {G}}}$, is constructed from a groupoid ${\displaystyle {\mathsf {G}}}$ as follows. The object set of ${\displaystyle R{\mathsf {G}}}$ is the same as that of ${\displaystyle {\mathsf {G}}}$ and ${\displaystyle R{\mathsf {G}}(b,c)}$ is the free R-module on the set ${\displaystyle {\mathsf {G}}(b,c)}$, with composition given by the usual bilinear rule, extending the composition of ${\displaystyle {\mathsf {G}}}$.

R-category

A groupoid ${\displaystyle {\mathsf {G}}}$ can be regarded as a category with invertible morphisms. Then an R-category is defined as an extension of the R-algebroid concept by replacing the groupoid ${\displaystyle {\mathsf {G}}}$ in this construction with a general category C that does not have all morphisms invertible.

R-algebroids via convolution products

One can also define the R-algebroid, ${\displaystyle {\bar {R}}{\mathsf {G}}:=R{\mathsf {G}}(b,c)}$, to be the set of functions ${\displaystyle {\mathsf {G}}(b,c){\longrightarrow }R}$ with finite support, and with the convolution product defined as follows: ${\displaystyle \displaystyle (f*g)(z)=\sum \{(fx)(gy)\mid z=x\circ y\}}$ .

Only this second construction is natural for the topological case, when one needs to replace 'function' by 'continuous function with compact support', and in this case ${\displaystyle R\cong \mathbb {C} }$.

Examples

• Every Lie algebra is a Lie algebroid over the one point manifold.
• The Lie algebroid associated to a Lie groupoid.

See also

• Algebraic category
• Algebroid (disambiguation)
• Bialgebra
• Bicategory
• Convolution product
• Crossed module
• Double groupoid
• Higher-dimensional algebra
• Hopf algebra
• Module (mathematics)
• Ring (mathematics)

References

1. Mosa 1986
2. Brown & Mosa 1986

This article incorporates material from Algebroid Structures and Algebroid Extended Symmetries on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.

Sources

• Brown, R.; Mosa, G. H. (1986). "Double algebroids and crossed modules of algebroids". Maths Preprint. University of Wales-Bangor.
• Mosa, G.H. (1986). Higher dimensional algebroids and Crossed complexes (PhD). University of Wales. uk.bl.ethos.815719.
• Mackenzie, Kirill C.H. (1987). Lie Groupoids and Lie Algebroids in Differential Geometry. London Mathematical Society Lecture Note Series. Vol. 124. Cambridge University Press. ISBN 978-0-521-34882-9.
• Mackenzie, Kirill C.H. (2005). General Theory of Lie Groupoids and Lie Algebroids. London Mathematical Society Lecture Note Series. Vol. 213. Cambridge University Press. ISBN 978-0-521-49928-6.
• Marle, Charles-Michel (2002). "Differential calculus on a Lie algebroid and Poisson manifolds". arXiv:0804.2451 .
• Weinstein, Alan (1996). "Groupoids: unifying internal and external symmetry". AMS Notices. 43: 744–752. arXiv:math/9602220. Bibcode:1996math......2220W. CiteSeerX 10.1.1.29.5422.

• Algebras
• Algebraic topology
• Category theory
• Lie algebras
• Lie groupoids