certain monomial characters and their subnormal constituents · st. andrews, august 2013 carolina...
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Certain Monomial Characters and Their
Subnormal Constituents
Carolina Vallejo
Universitat de Valencia
St. Andrews, August 2013
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This is a joint work with G. Navarro.
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Introduction
Introduction
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Introduction
Let G be a group. A character � 2 Irr(G ) is said to be monomial if
there exist a subgroup U � G and a linear � 2 Irr(U), such that
� = �G :
A group G is said to be monomial if all its irreducible characters are
monomial.
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Introduction
Let G be a group. A character � 2 Irr(G ) is said to be monomial if
there exist a subgroup U � G and a linear � 2 Irr(U), such that
� = �G :
A group G is said to be monomial if all its irreducible characters are
monomial.
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Introduction
There are few results guaranteeing that a given character of a group
is monomial. It is well-known the following
TheoremLet G be a supersolvable group. Then all irreducible characters of G
are monomial.
But this result depends more on the structure of the group than on
characters themselves.
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Introduction
There are few results guaranteeing that a given character of a group
is monomial. It is well-known the following
TheoremLet G be a supersolvable group. Then all irreducible characters of G
are monomial.
But this result depends more on the structure of the group than on
characters themselves.
Carolina Vallejo (Universitat de Valencia) Certain Monomial Characters St. Andrews, August 2013 5 / 15
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Introduction
There are few results guaranteeing that a given character of a group
is monomial. It is well-known the following
TheoremLet G be a supersolvable group. Then all irreducible characters of G
are monomial.
But this result depends more on the structure of the group than on
characters themselves.
Carolina Vallejo (Universitat de Valencia) Certain Monomial Characters St. Andrews, August 2013 5 / 15
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Introduction
An interesting result.
Theorem (Gow)
Let G be a solvable group. Suppose that � 2 Irr(G ) takes real
values and has odd degree. Then � is rational-valued and monomial.
We give a monomiality criterium which also deals with fields of values
and degrees of characters.
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Introduction
An interesting result.
Theorem (Gow)
Let G be a solvable group. Suppose that � 2 Irr(G ) takes real
values and has odd degree. Then � is rational-valued and monomial.
We give a monomiality criterium which also deals with fields of values
and degrees of characters.
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Introduction
An interesting result.
Theorem (Gow)
Let G be a solvable group. Suppose that � 2 Irr(G ) takes real
values and has odd degree. Then � is rational-valued and monomial.
We give a monomiality criterium which also deals with fields of values
and degrees of characters.
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Introduction
Notation: For n an integer, we write
Qn = Q(�);
where � is a primitive nth root of unity.
Theorem ALet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and the values of � are contained in the cyclotomic extension
QjG jp , then � is monomial.
When p = 2, we can recover Gow’s result from Theorem A.
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Introduction
Notation: For n an integer, we write
Qn = Q(�);
where � is a primitive nth root of unity.
Theorem ALet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and the values of � are contained in the cyclotomic extension
QjG jp , then � is monomial.
When p = 2, we can recover Gow’s result from Theorem A.
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Introduction
Notation: For n an integer, we write
Qn = Q(�);
where � is a primitive nth root of unity.
Theorem ALet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and the values of � are contained in the cyclotomic extension
QjG jp , then � is monomial.
When p = 2, we can recover Gow’s result from Theorem A.
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Introduction
The hypothesis about the index jNG (P) : P j is necessary.
Consider
the group SL(2,3) and the prime p=3.
The solvability hypothesis is necessary in both Gow’s and Theorem A.
The alternating group A6 is a counterxample in the two cases.
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Introduction
The hypothesis about the index jNG (P) : P j is necessary. Consider
the group SL(2,3) and the prime p=3.
The solvability hypothesis is necessary in both Gow’s and Theorem A.
The alternating group A6 is a counterxample in the two cases.
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Introduction
The hypothesis about the index jNG (P) : P j is necessary. Consider
the group SL(2,3) and the prime p=3.
The solvability hypothesis is necessary in both Gow’s and Theorem A.
The alternating group A6 is a counterxample in the two cases.
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Introduction
The hypothesis about the index jNG (P) : P j is necessary. Consider
the group SL(2,3) and the prime p=3.
The solvability hypothesis is necessary in both Gow’s and Theorem A.
The alternating group A6 is a counterxample in the two cases.
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B� Theory
B� Theory
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B� Theory
We say that � 2 Irr(G ) is a �-special character of G , if
(a) �(1) is a �-number.
(b) For every subnormal subgroup N / /G , the order of all the
irreducible constituents of �N is �-number.
A B� character of a group G may be thought as an irreducible
character of G induced from a �-special character of some subgroup
of G . (True in groups of odd order).
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B� Theory
We say that � 2 Irr(G ) is a �-special character of G , if
(a) �(1) is a �-number.
(b) For every subnormal subgroup N / /G , the order of all the
irreducible constituents of �N is �-number.
A B� character of a group G may be thought as an irreducible
character of G induced from a �-special character of some subgroup
of G . (True in groups of odd order).
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B� Theory
We say that � 2 Irr(G ) is a �-special character of G , if
(a) �(1) is a �-number.
(b) For every subnormal subgroup N / /G , the order of all the
irreducible constituents of �N is �-number.
A B� character of a group G may be thought as an irreducible
character of G induced from a �-special character of some subgroup
of G . (True in groups of odd order).
Carolina Vallejo (Universitat de Valencia) Certain Monomial Characters St. Andrews, August 2013 10 / 15
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B� Theory
We say that � 2 Irr(G ) is a �-special character of G , if
(a) �(1) is a �-number.
(b) For every subnormal subgroup N / /G , the order of all the
irreducible constituents of �N is �-number.
A B� character of a group G may be thought as an irreducible
character of G induced from a �-special character of some subgroup
of G .
(True in groups of odd order).
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B� Theory
We say that � 2 Irr(G ) is a �-special character of G , if
(a) �(1) is a �-number.
(b) For every subnormal subgroup N / /G , the order of all the
irreducible constituents of �N is �-number.
A B� character of a group G may be thought as an irreducible
character of G induced from a �-special character of some subgroup
of G . (True in groups of odd order).
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Main results
Main results
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Main results
Now, I can state the main result.
Theorem BLet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and its values are contained in the cyclotomic extension QjG jp ,
then � is a Bp character of G .
We notice that Bp characters with degree not divisible by p are
monomial.Thus Theorem B implies Theorem A.
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Main results
Now, I can state the main result.
Theorem BLet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and its values are contained in the cyclotomic extension QjG jp ,
then � is a Bp character of G .
We notice that Bp characters with degree not divisible by p are
monomial.Thus Theorem B implies Theorem A.
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Main results
Now, I can state the main result.
Theorem BLet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and its values are contained in the cyclotomic extension QjG jp ,
then � is a Bp character of G .
We notice that Bp characters with degree not divisible by p are
monomial.
Thus Theorem B implies Theorem A.
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Main results
Now, I can state the main result.
Theorem BLet G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not divisible
by p and its values are contained in the cyclotomic extension QjG jp ,
then � is a Bp character of G .
We notice that Bp characters with degree not divisible by p are
monomial.Thus Theorem B implies Theorem A.
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Main results
Subnormal constituents of B� characters are B� characters.
Then, as
a Corollary of Theorem B we get.
Corollary C
Let G be a p-solvable group. Suppose that jNG (P) : P j is odd,
where P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not
divisible by p and its field of values is contained in QjG jp , then every
subnormal constituent of � is monomial.
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Main results
Subnormal constituents of B� characters are B� characters. Then, as
a Corollary of Theorem B we get.
Corollary C
Let G be a p-solvable group. Suppose that jNG (P) : P j is odd,
where P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not
divisible by p and its field of values is contained in QjG jp , then every
subnormal constituent of � is monomial.
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Main results
Subnormal constituents of B� characters are B� characters. Then, as
a Corollary of Theorem B we get.
Corollary C
Let G be a p-solvable group. Suppose that jNG (P) : P j is odd,
where P 2 Sylp(G ) for some prime p. If � 2 Irr(G ) has degree not
divisible by p and its field of values is contained in QjG jp , then every
subnormal constituent of � is monomial.
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Main results
We also obtain the following consequence.
The number of such
characters can be computed locally.
Corollary D
Let G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. The number of irreducible characters
which have degree not divisible by p and field of values contained in
QjG jp equals the number of orbits under the natural action of NG (P)
on P=P 0.
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Main results
We also obtain the following consequence. The number of such
characters can be computed locally.
Corollary D
Let G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. The number of irreducible characters
which have degree not divisible by p and field of values contained in
QjG jp equals the number of orbits under the natural action of NG (P)
on P=P 0.
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Main results
We also obtain the following consequence. The number of such
characters can be computed locally.
Corollary D
Let G be a p-solvable group. Assume that jNG (P) : P j is odd, where
P 2 Sylp(G ) for some prime p. The number of irreducible characters
which have degree not divisible by p and field of values contained in
QjG jp equals the number of orbits under the natural action of NG (P)
on P=P 0.
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Main results
Thanks for your attention!
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