Alternating group meaning

The alternating group is a mathematical concept representing permutations that can be expressed as an even number of transpositions.


Alternating group definitions

Word backwards gnitanretla puorg
Part of speech The part of speech of the word "alternating group" is a noun.
Syllabic division al-ter-nat-ing group
Plural The plural form of "alternating group" is "alternating groups."
Total letters 16
Vogais (5) a,e,i,o,u
Consonants (6) l,t,r,n,g,p

Alternating groups are a fundamental concept in group theory, a branch of abstract algebra. These groups are denoted by An, where n represents the number of elements in the group. The alternating group consists of even permutations of n elements. In other words, it is the set of all even permutations that can be obtained by composing an even number of transpositions.

Structure of Alternating Group

The alternating group An is a subgroup of the symmetric group Sn, which consists of all possible permutations of n elements. An is the subgroup of Sn containing all even permutations. It is important to note that An is not a normal subgroup of Sn for n ≥ 2, except when n = 2.

Sign of a Permutation

Every permutation in the alternating group can be classified as either an even permutation or an odd permutation based on its sign. The sign of a permutation is determined by counting the number of transpositions required to express the permutation. Even permutations have a sign of +1, while odd permutations have a sign of -1.

Properties of Alternating Group

One of the key properties of the alternating group is that it is a simple group for n ≥ 5. This means that An is a nontrivial group that does not contain any nontrivial normal subgroups. Simple groups play a crucial role in group theory and have applications in various areas of mathematics.

Overall, alternating groups are an essential concept in group theory, providing a deeper understanding of permutations and symmetries. By studying the properties and structure of alternating groups, mathematicians can explore the intricate patterns and relationships that exist within these mathematical structures.


Alternating group Examples

  1. The alternating group A4 is a subgroup of the symmetric group S4.
  2. In group theory, the alternating group is denoted as An.
  3. The alternating group is characterized by even permutations of its elements.
  4. The alternating group A5 is the only simple alternating group for n at least 5.
  5. The alternating group has half the elements of the symmetric group of the same degree.
  6. An example of an alternating group is A3, which consists of even permutations of 3 elements.
  7. The alternating group is important in the classification of finite simple groups.
  8. The alternating group A6 has order 360.
  9. Alternating groups are commonly used in algebraic topology and representation theory.
  10. The alternating group An is simple for n at least 5.


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  • Updated 27/04/2024 - 02:08:47