Finite Groups with Only One NonLinear Irreducible Representation

Let G be a finite group of order g, andbe an absolutely irreducible representation of degree fμ over a field of characteristic zero. As is well known, by using Schur's lemma (1), we can prove the following orthogonality relations for the coefficients :1It is easy to conclude from (1) the following orthogonality relations for characters:whereand is 1 or 0 according as t and s are conjugate in G or not, and n(t) is the order of the normalize of t.

Download Full-text

UNIPOTENT ELEMENTS IN REPRESENTATIONS OF FINITE GROUPS OF LIE TYPE

Journal of Algebra and Its Applications ◽

10.1142/s0219498811005622 ◽

2012 ◽

Vol 11 (02) ◽

pp. 1250038 ◽

Cited By ~ 2

Author(s):

L. DI MARTINO ◽

A. E. ZALESSKI

Keyword(s):

Normal Subgroup ◽

Irreducible Representation ◽

Simple Group ◽

Finite Groups ◽

Closed Field ◽

Group Of Lie Type ◽

Algebraically Closed Field ◽

Central Quotient ◽

Representations Of Finite Groups ◽

Groups Of Lie Type

Let G be a finite quasi-simple group of Lie type of defining characteristic r > 2. Let H = 〈h, G〉 be a group with normal subgroup G, where h is a non-central r-element of H. Let ϕ be an irreducible representation of H non-trivial on G over an algebraically closed field of characteristic ℓ ≠ r. We show that ϕ(h) has at least two distinct eigenvalues of multiplicity greater than 1, unless G is a central quotient of one of the following groups: SL(2, r), SL(2, 9) or Sp(4, 3), and H = G⋅Z(H).

Download Full-text

Infinite groups admitting a faithful irreducible representation

Journal of Algebra and Its Applications ◽

10.1142/s0219498818500056 ◽

2018 ◽

Vol 17 (01) ◽

pp. 1850005

Author(s):

Fernando Szechtman ◽

Anatolii Tushev

Keyword(s):

Irreducible Representation ◽

Finite Groups ◽

Sufficient Conditions ◽

Necessary And Sufficient Conditions ◽

Infinite Groups ◽

Locally Finite ◽

Locally Finite Groups ◽

Necessary And Sufficient

Necessary and sufficient conditions for a group to possess a faithful irreducible representation are investigated. We consider locally finite groups and groups whose socle is essential.

Download Full-text

Geometry of Group Representations

Nagoya Mathematical Journal ◽

10.1017/s0027763000026337 ◽

1966 ◽

Vol 27 (2) ◽

pp. 509-513 ◽

Cited By ~ 1

Author(s):

G. De B. Robinson

Keyword(s):

Irreducible Representation ◽

Finite Groups ◽

Group Representations ◽

Tensor Power ◽

The Many

The many unanswerable questions (1) which arise in the study of finite groups have lead to a review of fundamental ideas, e.g. the Theorem of Burnside (3, p. 299; 2, 6) that if λ be any faithful irreducible representation of G over a field K, then every irreducible representation of G over K is contained in some tensor power of λ.

Download Full-text

Finite groups with an irreducible representation of large degree

Mathematische Zeitschrift ◽

10.1007/bf01114468 ◽

1969 ◽

Vol 108 (2) ◽

pp. 145-153 ◽

Cited By ~ 31

Author(s):

Frank R. DeMeyer ◽

Gerald J. Janusz

Keyword(s):

Irreducible Representation ◽

Finite Groups ◽

Large Degree

Download Full-text

Condition that All Irreducible Representations of a Compact Lie Group, if Restricted to a Subgroup, Contain no Representation More than Once

Canadian Journal of Mathematics ◽

10.4153/cjm-1972-036-3 ◽

1972 ◽

Vol 24 (3) ◽

pp. 432-438 ◽

Cited By ~ 3

Author(s):

Fredric E. Goldrich ◽

Eugene P. Wigner

Keyword(s):

Irreducible Representation ◽

Lie Groups ◽

Finite Groups ◽

Lie Group ◽

Unitary Group ◽

Unit Vector ◽

Doctoral Dissertation ◽

Irreducible Representations ◽

Compact Lie Group ◽

Compact Lie Groups

One of the results of the theory of the irreducible representations of the unitary group in n dimensions Un is that these representations, if restricted to the subgroup Un-1 leaving a vector (let us say the unit vector e1 along the first coordinate axis) invariant, do not contain any irreducible representation of this Un-1 more than once (see [1, Chapter X and Equation (10.21)]; the irreducible representations of the unitary group were first determined by I. Schur in his doctoral dissertation (Berlin, 1901)). Some time ago, a criterion for this situation was derived for finite groups [3] and the purpose of the present article is to prove the aforementioned result for compact Lie groups, and to apply it to the theory of the representations of Un.

Download Full-text

Splitting fields of real irreducible representations of finite groups

Representation Theory of the American Mathematical Society ◽

10.1090/ert/587 ◽

2021 ◽

Vol 25 (31) ◽

pp. 897-902

Author(s):

Dmitrii Pasechnik

Keyword(s):

Finite Group ◽

Irreducible Representation ◽

Finite Groups ◽

Irreducible Representations ◽

Content Type ◽

Cyclotomic Numbers ◽

Representations Of Finite Groups ◽

A Finite Group ◽

Algorithmic Procedure

We show that any irreducible representation ρ \rho of a finite group G G of exponent n n , realisable over R \mathbb {R} , is realisable over the field E ≔ Q ( ζ n ) ∩ R E≔\mathbb {Q}(\zeta _n)\cap \mathbb {R} of real cyclotomic numbers of order n n , and describe an algorithmic procedure transforming a realisation of ρ \rho over Q ( ζ n ) \mathbb {Q}(\zeta _n) to one over E E .

Download Full-text