The Rational valued
characters of the Group (Q2m×C2)
when m=2h , h∈Z+
1.Abstract
The main purpose of this
paper is to find the rational valued characters table of the group (Q2m×C2)
,when m=2h , h∈Z+, which is
denoted by ≡*(Q2h+1×C2) ,where Q2m is denoted to
Quaternion group ,and C2 is the cyclic
group of order 2.
Moreover we have found the
general form of the rational valued characters table of the group (Q2h+1×C2).
2.Introduction
Let G be a finite group ,two
elements of G are said to be -conjugate
if the cyclic subgroups they generate are conjugate in G; this
-relation defines an equivalence
relation on G.Its classes are called - classes
The Z-valued class function
on the group G, which is constant on the - classes forms a
finitely generated abelian group
cf(G,Z) of a rank equal to the number of - classes
The intersection of cf(G,Z)
with the group of all generalized characters of G, R(G) is a normal subgroup of
cf(G,Z) denoted by , Each element
in can be written as u1θ1+ u2θ2+……+ u θ
, where is the number of
-classes ,
u1,u2 , … ,u Z and = , where is an irreducible character of the group G
and is any
element in Galios group .
Let ≡*(G) denotes the matrix which
the
rows corresponds to the 's and columns correspond to the - classes of G
.In 1995
N. R. Mahamood [3] studied
the factor group cf(Q2m,Z) / (Q2m). The aim of this paper is to find ≡*(Q2h+1×C2) and
determine general
( ) matrix form of the rational valued characters table of the
group(Q2h+1×C2).
3.Preliminaries
The Generalized Quaternion
Group Q2m(3.1) [3]
For each positive integer m,
The generalized Quaternion Group Q2m of order 4m with two
generators and satisfies
Q2m =
which has the following
properties
The character table of the
quaternion group Q2m when m=2h , h∈Z+ (3.2) [3]
There are two types of
irreducible characters .one of them is the character of the linear
representations R1, R2, R3 and R4 which are denoted by ψ1, ψ2, ψ3 and ψ4.
respectively as in the following table:
xk xky
ψ1 1 1
ψ2 1 -1
ψ3 (-1)k (-1)k
Ψ4 (-1)k (-1)k+1
Table (1)
Where 0 ≤ k ≤ 2m-1.
The rest characters of
irreducible representations Th of degree 2 are denoted by χh such that :
χh (xk) = ωhk+ω-hk
=eπihk/m + e-πihk/m
=2cos(πhk/m)
We are denoted to ωhk+ω-hk
by Vhk ,Thus Vhk =V2m-hk ,Vm=-2
, V2M =2 .also we will write
VJ(hk) such that
J(hk) =min{hk (mod 2m),
2m-hk(mod 2m) },
in the character table of
the quaternion group Q2m when m=2h, where VJ (hk)= 2cos(πJ(hk)/m),
χh (xky) = 0
Where 0 ≤ k ≤ 2m-1, 1 ≤ h ≤
m-1
and ω =e2πi/2m.
So there are m+3 irreducible
characters of Q2m. Then , the general form of the characters table of Q2m when
m=2h , h∈Z+ is given in the table (2) .
Theorem (3.3)[1]
Let T1:G1→GL(n,K) and
T2:G2→GL(m,K) are two irreducible representation of the group G1 and G2 with
characters χ1 and χ2 respectively, then T1 T2 is irreducible representation of
the group G1×G2 with the character χ1.χ2.
The Group Q2m×C2 (3.4)
The direct product group
Q2m×C2 ,where C2 is a cyclic group of order 2 then
|Q2m×C2|= 8m .
Since , the irreducible
representations of the group Q2m×C2 are
the tensor products of those of Q2m and those of C2.The group C2 has two
irreducible representations, their characters σ1 and σ2 are given in the
table(2):
CLα 1 r
| CLα| 1 1
σ1 1 1
σ2 1 -1
According to Theorem (3.3),
each irreducible character χi of Q2m defines two irreducible characters χi1,χi2
such that χi1=χiσ1 , χi2 = χiσ2 of Q2m×C2 .
Then ≡(Q2m×C2) = ≡(Q2m) ≡(C2)
Example (3.5)
To find characters table of
Q16×C2 .
From (3.3) we have the
character table of Q16 as Table (3),Where Vi
=2cos(πi/8) , V2m=2 ,
Vm=-2 ,V4=2cos(4π/8)=0 .
And
CLα 1 R
| CLα| 1 1
σ1 1 1
σ2 1 -1
By Theorem (3.3), the
characters table of Q16×C2 can be written as follows:
≡ (Q16×C2) = ≡ (Q16) ≡ (C2),
Then ≡(Q16×C2) is given in the table (4) .
Where Vi =2cos(πi/8) , V2m=2 , Vm=-2 ,V4=2cos(4π/8)=0 .
4.The main results
Proposition(4.1)[2]
The rational valued
characters form basis for , where
are the irreducible characters of G and their numbers are equal to the
number of all distinct Γ-classes of G.
The rational character table
of the quaternion group Q2m when m=2h , h∈Z+ (4.2)[3]
the rational characters
table of Q2m when m=2h , h∈Z+ is given in the following table (after change order the rows and the columns) :
≡*(Q2h+1)=
1 1 1
1 1 .
. . 1
1 1
-1 1 -1
1 1 .
. . 1
1 1
-1 -1 1
1 1 .
. . 1
1 1
1 -1
-1 1 1
. . .
1 1 1
0 0
0 -2 2
. . .
2 2 2
0 0
0 0 -4
. . .
4 4 4
0 0 0
. . .
. 0 -2h-1
2h-1 2h-1
0 0 0
. . .
. 0 0
-2h 2h
Example (4.3)
To construct the rational
valued characters table of Q16×C2,when have to do the following:
From Example(3.5) we have
the characters table of Q16×C2 .
By the definition of Q2m×C2 :
≡(Q16×C2)= (≡Q16) (≡C2)
To calculate the rational
valued character table of Q16×C2,
θ11=11, θ12=12,
θ21=41, θ22=42, θ31=21, θ32=22, θ41=31, θ42=32 ,
θ51= χ41, θ52= χ42 .
The elements of Gal(χ1i)/Q,
are :
{σ1i, σ3i, σ5i, σ7i }
Where σ1i(χ1i)= χ1i ,
σ3i(χ1i)= χ3i ,
σ5i(χ1i)= χ5i , σ7i(χ1i)= χ7i and i=1,2.
By proposition (4.1)
1- (I) if i=1
θ71= σ11(χ11)+ σ31(χ11)+
σ51(χ11)+ σ71(χ11)
θ71 ([1,1])=2+2+2+2=8
θ71 ([1,r])=2+2+2+2=8
θ71 ([x8,1])= (-2)+ (-2)+
(-2)+ (-2)=-8
θ71 ([x8,r])= (-2)+ (-2)+
(-2)+ (-2)=-8
θ71([x,1])=V1+ V3+ V5+ V7=0
θ71 ([x,r])= V1+ V3+ V5+
V7=0
θ71 ([x2,1])= V2+ V6+ V6+
V2=0
θ71 ([x2,r])= V2+ V6+ V6+
V2=0
θ71 ([x4,1])= 0+0+0+0=0
θ71 ([x4,r])= 0+0+0+0=0
θ71([y,1])=0
θ71 ([y, r])=0
θ71 ([xy,1])=0
θ71 ([xy, r])=0
1- (II) if i=2
θ72= σ12(χ12)+ σ32(χ12)+
σ52(χ12)+ σ72(χ12)
θ72 ([1,1])=2+2+2+2=8
θ72 ([1,r])= (-2)+ (-2)+
(-2)+ (-2)=-8
θ72 ([x8,1])= (-2)+ (-2)+
(-2)+ (-2)=-8
θ72 ([x8,r])= 2+2+2+2=8
θ72 ([x,1])=V1+ V3+ V5+ V7=0
θ72 ([x,r])= (-V1)+ (-V3)+
(-V5)+(-V7)=0
θ72 ([x2,1])= V2+ V6+ V6+
V2=0
θ72 ([x2,r])= (-V2)+ (-V6)+
(-V6)+ (-V2)=0
θ72 ([x4,1])= 0+0+0+0=0
θ72 ([x4,r])= 0+0+0+0=0
θ72 ([y,1])=0
θ72([y, r])=0
θ72 ([xy,1])=0
θ72([xy, r])=0
Also σ1i(χ2i)= χ2i ,
σ3i(χ2i)= χ6i , σ5i(χ1i)= χ6i , σ7i(χ1i)= χ2i
and i=1,2.
By proposition (4.1) then
θ4i= χ2i+ χ6i
2- (I) if i=1
θ61= χ21+ χ61
θ61([1,1])=2+2=4
θ61([1,r])= 2+2=4
θ61 ([x8,1])= 2+2=4
θ61 ([x8,r])= 2+2=4
θ61 ([x,1])= V2+ V6=0
θ61 ([x,r])= V2+ V6=0
θ61 ([x2,1])= 0+0=0
θ61 ([x2,r])= 0+0=0
θ61 ([x4,1])= (-2)+ (-2)= -4
θ61 ([x4,r])= (-2)+ (-2)= -4
θ61 ([y,1])=0
θ61([y, r])=0
θ61 ([xy,1])=0
θ61([xy, r])=0
2- (II) if i=2
θ62= χ22+ χ62
θ62 ([1,1])= 2+2=4
θ62 ([1,r])= (-2)+ (-2)= -4
θ62 ([x8,1])= 2+2=4
θ62 ([x8,r])= (-2)+ (-2)= -4
θ62 ([x,1])= V2+ V6=0
θ62 ([x,r])= (-V2)+(- V6)=0
θ62 ([x2,1])= 0+0=0
θ62 ([x2,r])= 0+0=0
θ62 ([x4,1])= (-2)+ (-2)= -4
θ62 ([x4,r])= 2+2=4
θ62 ([y,1])=0
θ62([y, r])=0
θ62 ([xy,1])=0
θ62([xy, r])=0
The elements
[x,1],[x3,1],[x5,1],[x7,1]
are in the same г-conjugate and[x, r],
[x3, r], [x5, r],[x7, r] are
in the same
г-conjugate and[x2,1],[x6,1]
are in the same
г-conjugate and [x2,
r],[x6,r]are in the same
г-conjugate as Table (6) .
Theorem (4.4)
The rational valued
characters table of the group Q2m×C2 when m=2h , h∈Z+ is given as follows:
≡*(Q2m×C2) = ≡*(Q2m) ≡*(C2)
Proof:-
Since
1 1
1 -1
≡*(C2)=
From the definition of
Q2m×C2, (theorem (3.4)),
≡Q2m×C2 = (≡Q2m) (≡C2)
each element in Q2m×C2
Q2m , C2
n=1,2,3,…,4m , s=1,2
and each irreducible
character of Q2m×C2 is
Where is an irreducible character of Q2m and is an irreducible character of C2 , then
From proposition (4.1)
Where is the rational valued of character table of
Q2m×C2
Then ,
(I) if j=1 and s=1,2
Where
is the rational valued character of Q2m.
(II) (a) if j=2 and s=1
(b) if j=2 and s=2
From (I) and (II) we have
Then ≡*(Q2m×C2) = ≡*(Q2m) ≡*(C2)
The rational character table
of the quaternion group (Q2m×C2) when
m=2h , h∈Z+ (4.5)
From Theorem (4.4) and form of ≡*(Q2h+1)= in then table (5) then
The rational character table of the quaternion group (Q2m×C2) when m=2h , h∈Z+ is given in the general ( ) matrix form ≡*(Q2h+1×C2) as Table (7) .
Example (4.3)
By using Theorem (4.4) the
rational valued characters table of Q16×C2, Since h=3 ,it is same to the table
Example (4.3), (after change order the
rows and the columns) as Table (8) .
References
[1] C. W. Curtis & I.
Reiner ''Representation Theory
of Finite Groups and Associative Algebras'', AMS Chelsea publishing, 1962,
printed by the AMS, 2006.
[2] M. S. Kirdar '' The factor group of the Z-valued class function modulo
the group of the Generalized characters'',Ph.D. thesis, University of
Birmingham, 1982.
[3] N. R. Mahamood ''The Cyclic Decomposition of The Factor Group of (Q2m)/
(Q2m)''.M. Sc thesis, Technology University, 1995
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