Determination of character table of alternating group:A5: Difference between revisions

This page describes the process used for the determination of specific information related to a particular group. The information type is character table and the group is alternating group:A5.
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This page is incomplete. At present, it only includes the determination of the degrees of irreducible representations, not the entire character table.

This page describes various ways to determine the character table of alternating group:S5. The idea is to determine as much as possible wit has little knowledge of the representation theory of these groups as we can manage, therefore making the discussion suitable for people who know only basic facts about the groups and basic facts of linear representation theory. For a detailed discussion of the character theory, see linear representation theory of alternating group:A5.

Finding the degrees of irreducible representations using number-theoretic constraints

Final answer: The degrees of irreducible representations are 1, 3, 3, 4, 5.

The following facts are known in general:

1. Sum of squares of degrees of irreducible representations equals order of group: In this case, it tells us that the sum of the degrees of irreducible representations is 60, the order of the group.
2. Number of irreducible representations equals number of conjugacy classes: In this case, it tells us that there are 5 irreducible representations, because there are 5 conjugacy classes.
3. Degree of irreducible representation divides order of group: In this case, it tells us that the degrees of irreducible representations all divide 60, the order of the group.
4. Number of one-dimensional representations equals order of abelianization: In this case, the group is a perfect group (in fact, it is a simple non-abelian group -- see A5 is simple) so there is only one one-dimensional representation.
5. Order of inner automorphism group bounds square of degree of irreducible representation

(2) tells us that there are five irreducible representations. Denote their (positive integer) degrees, in non-decreasing order, as ${\displaystyle d_1\le d_2\le \dots \le d_5}$. (1) tells us that ${\displaystyle d_1^2+d_2^2+d_3^2+d_4^2+d_5^2=60}$. Note that ${\displaystyle d_5\le 7}$ because ${\displaystyle 8^2=64>60}$. Moreover, (3) tells us that all the degrees must divide 60, this eliminates the case ${\displaystyle d_5=7}$. There exists a trivial representation, so ${\displaystyle d_1=1}$ and ${\displaystyle 1\le d_2\le d_3\le d_4\le d_5}$. We thus have:

${\displaystyle d_2^2+d_3^2+d_4^2+d_5^2=59}$

with ${\displaystyle 1\le d_2\le d_3\le d_4\le d_5\le 6}$. Note that we can use (4) to show that ${\displaystyle 2\le d_2}$, but we will be able to narrow down to a unique choice of degrees of irreducible representations even without this information.

Case ${\displaystyle d_5=6}$

In this case, we obtain:

${\displaystyle d_2^2+d_3^2+d_4^2=23}$

However, 23 cannot be expressed as a sum of three squares. So this case is eliminated.

Case ${\displaystyle d_5=5}$

In this case, we obtain:

${\displaystyle d_2^2+d_3^2+d_4^2=34}$

Consider the subcases:

• ${\displaystyle d_4=5}$: This gives ${\displaystyle d_2^2+d_3^2=9}$, but 9 is not the sum of two squares of positive integers. So this case is ruled out.
• ${\displaystyle d_4=4}$: This gives ${\displaystyle d_2^2+d_3^2=18}$, giving the solution ${\displaystyle d_2=d_3=3}$. We thus get ${\displaystyle d_1=1,d_2=3,d_3=3,d_4=4,d_5=5}$.
• ${\displaystyle d_4\le 3}$: This is not possible, because ${\displaystyle 34=d_2^2+d_3^2+d_4^2\le 3d_4^2}$, so ${\displaystyle d_4^2\ge 34/3}$.

Case ${\displaystyle d_5\le 4}$

In this case, we obtain:

${\displaystyle d_2^2+d_3^2+d_4^2=43}$

with ${\displaystyle d_4\le 4}$. By size considerations, ${\displaystyle d_4=4}$ is forced, and ${\displaystyle d_3=4}$ is also forced. But this leaves ${\displaystyle d_2^2=11}$, which does not give an integer value of ${\displaystyle d_2}$.