Copyright © Philip M. Parker, INSEAD. Terms of Use.
Definition: Group Action |
Group ActionNoun1. Action taken by a group of people. Source: WordNet 1.7.1 Copyright © 2001 by Princeton University. All rights reserved. |
Crosswords: Group Action |
| English words defined with "group action": desegregation ♦ firing line, force ♦ getting even, Glyoxime ♦ Hydramide ♦ integrating, integration ♦ MAOI, monoamine oxidase inhibitor, motivated ♦ paying back, policy ♦ resistance, return ♦ social control. (references) |
| Specialty definitions using "group action": Adjuvants, Immunologic, alkali bentonite, automaticity ♦ biolite, boundary scan ♦ case supervisor, CASEWORK SUPERVISOR, CATS, Cephamycins, Cyclodextrins, Cyclosporins ♦ Decision Theory ♦ group leader ♦ IEEE Standard 1149.1 ♦ Joint Test Action Group, JTAG ♦ Nujol ♦ patterned ground, Phosphoprotein Phosphatase, PREPAROLE-COUNSELING AIDE, PSYCHOLOGIST, COUNSELING ♦ Receptors, Cholinergic ♦ social work unit supervisor, SOCIAL WORKER, DELINQUENCY PREVENTION ♦ team coordinator, tensor product ♦ UTILITY WORKER, LINE ASSEMBLY. (references) |
(From Wikipedia, the free Encyclopedia)
If G is a group and X is a set, then a (left) group action of G on X is a binary function G × X -> X (where the image of g in G and x in X is written as g.x) which satisfies the following two axioms:
If a group action G × X -> X is given, we also say that G acts on the set X or X is a G-set.
In complete analogy, one can define a right group action of G on X as a function X × G -> X by the two axioms (x.g).h = x.(gh) and x.e = x. In the sequel, we consider only left group actions.
The action of G on X is called
If we define N = {g in G : g.x = x for all x in X}, then N is a normal subgroup of G and the factor group G/N acts faithfully on X by setting (gN).x = g.x. The action of G on X is faithful if and only if N = {e}.
If Y is a subset of X, we write GY for the set { g.y : y in Y and g in G}.
We call the subset Y invariant under G if GY = Y (which is equivalent to GY ⊆ Y).
In that case, G also operates on Y.
The subset Y is called fixed under G if g.y = y for all g in G and all y in Y. Every subset that's fixed under G is also invariant under G, but not vice versa.
Any operation of G on X defines an equivalence relation on X: two elements x and y are called equivalent if there exists a g in G with g.x = y.
The equivalence class of x under this equivalence relation is given by the set Gx = { g.x : g in G } which is also called the orbit of x. The elements x and y are equivalent if and only if their orbits are the same: Gx = Gy. Every orbit is an invariant subset of X on which G acts transitively. The action of G on X is transitive if and only if all elements are equivalent, meaning that there is only one orbit. The set of all orbits is written as X/G.
For every x in X, we define Gx = { g in G : g.x = x }. This is a subgroup of G, and it is called the stabilizer of x or isotropy subgroup at x. The action of G on X is free if and only if all stabilizers consist only of the identity element.
There is a natural bijection
between the set of all left cosets of the subgroup Gx and the orbit of x, given by hGx |-> h.x.
Therefore, |Gx| = [G : Gx],
and so
Definition
From these two axioms, it follows that for every g in G, the function which maps x in X to g.x is a bijective map from X to X. Therefore, one may alternatively and equivalently define a group action of G on X as a group homomorphism G -> Sym(X), where Sym(X) denotes the group of all bijective maps from X to X.Examples
Types of actions
Every free action on a non-empty set is faithful.
A group G that acts faithfully on a set X is isomorphic to a permutation group on X. An action is regular if and only if it is transitive and free.Orbits and stabilizers
This result, known as the orbit-stabilizer theorem, is especially useful if G and X are finite, because then it can be employed for counting arguments.
A related result is Burnside's lemma:
where r is the number of orbits, and Xg is the set of points fixed by g.
This result too is mainly of use when G and X are finite, when it can be interpreted as follows: the number of orbits is equal to the average number of points fixed per group element.
Source: adapted by the editor from Wikipedia, the free encyclopedia under a copyleft GNU Free Documentation License (GFDL) from the article "Group action."
Scrabble® Enable2K-Verified Anagrams | |
| Words within the letters "a-c-g-i-n-o-o-p-r-t-u" | |
-2 letters: capturing, outpacing, outracing, purgation, uprooting. | |
-3 letters: autogiro, coapting, coopting, copatron, couranto, courting, curating, picaroon, protonic, rogation, trooping, trouping, uprating. | |
-4 letters: apricot, aprotic, argotic, atropin, auction, autoing, cantrip, caption, carotin, carping, carting, cartoon, caution, coating, contour, cooping, coranto, cornuto, couping, courant, craping, crating, crouton, curtain, ingroup, octagon, opuntia, orating, oration, organic, outcrop, outgain, outgrin. | |
| Words containing the letters "a-c-g-i-n-o-o-p-r-t-u" | |
+1 letter: compurgation. | |
+2 letters: compurgations. | |
+4 letters: neuropathologic. | |
+5 letters: counterespionage, ultrasonographic. | |
| Source: compiled by the editor from various references; see credits. SCRABBLE® is a registered trademark. All intellectual property rights in and to the game are owned in the U.S.A and Canada by Hasbro Inc., and throughout the rest of the world by J.W. Spear & Sons Limited of Maidenhead, Berkshire, England, a subsidiary of Mattel Inc. Mattel and Spear are not affiliated with Hasbro. | |
Hexadecimal (or equivalents, 770AD-1900s) (references)47 72 6F 75 70 41 63 74 69 6F 6E |
| Leonardo da Vinci (1452-1519; backwards) (references)
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Binary Code (1918-1938, probably earlier) (references)01000111 01110010 01101111 01110101 01110000 00100000 01000001 01100011 01110100 01101001 01101111 01101110 |
HTML Code (1990) (references)G r o u p   A c t i o n |
ISO 10646 (1991-1993) (references)0047 0072 006F 0075 0070 0041 0063 0074 0069 006F 006E |
Encryption (beginner's substitution cypher): (references)41848187822356986758180 |
| 1. Definition 2. Crosswords 3. Anagrams 4. Orthography | 5. Bibliography |
Copyright © Philip M. Parker, INSEAD. Terms of Use.
