Difference between revisions of "Groupoid"
From Online Dictionary of Crystallography
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<font color="blue">Groupoïde</font> (''Fr'')
<font color="blue">Groupoïde</font> (''Fr'')<font color="red">Gruppoid</font> (''Ge'')<font color="black">Gruppoide</font> (''It'')<font color="purple">亜群</font> (''Ja'')<font color="brown">Группоид</font> (''Ru'')<font color="green">Grupoide</font> (''Sp'').
Revision as of 14:46, 13 November 2017
Groupoïde (Fr). Gruppoid (Ge). Gruppoide (It). 亜群 (Ja). Группоид (Ru). Grupoide (Sp).
A groupoid (G,*) is a set G with a law of composition * mapping of a subset of G × G into G. The properties of a groupoid are:
- if x, y, z ∈ G and if one of the compositions (x*y)*z or x*(y*z) is defined, so is the other and they are equal (associativity);
- if x, x' and y ∈ G are such that x*y and x' * y are defined and equal, then x = x' (cancellation property);
- for all x ∈ G there exist elements ex (left unit of x), ex' (right unit of x) and x−1 ('inverse' of x) such that:
- ex * x = x
- x * ex' = x
- x−1 * x = ex'.
From these properties it follows that:
- x * x−1 = ex, i.e. that ex is right unit for x−1,
- ex' is left unit for x−1
- ex and ex' are idempotents, i.e. ex * ex = ex and ex' * ex' = ex'.
The concept of groupoid as defined here was introduced by Brandt (1927). An alternative meaning of groupoid was introduced by Hausmann and Ore (1937) as a set on which binary operations act but neither the identity nor the inversion are included. For this second meaning nowadays the term magma is used instead (Bourbaki, 1998).
- Bourbaki, N. (1998). Elements of Mathematics: Algebra 1. Springer.
- Brandt, H. (1927). Mathematische Annalen, 96, 360-366.
- Hausmann, B. A. and Ore, O. (1937). American Journal of Mathematics, 59, 983-1004.