We establish an irreducibility property for the characters of finite dimensional, irreducible representations of simple Lie algebras (or simple algebraic groups) over the complex numbers, i.e., that the characters of irreducible representations are irreducible after dividing out by (generalized) Weyl denominator type factors.
For
S
L
(
r
)
SL(r)
the irreducibility result is the following: let
λ
=
(
a
1
≥
a
2
≥
⋯
≥
a
r
−
1
≥
0
)
\lambda =(a_1\geq a_2\geq \cdots \geq a_{r-1}\geq 0)
be the highest weight of an irreducible rational representation
V
λ
V_{\lambda }
of
S
L
(
r
)
SL(r)
. Assume that the integers
a
1
+
r
−
1
,
a
2
+
r
−
2
,
⋯
,
a
r
−
1
+
1
a_1+r-1, ~a_2+r-2, \cdots , a_{r-1}+1
are relatively prime. Then the character
χ
λ
\chi _{\lambda }
of
V
λ
V_{\lambda }
is strongly irreducible in the following sense: for any natural number
d
d
, the function
χ
λ
(
g
d
)
,
g
∈
S
L
(
r
,
C
)
\chi _{\lambda }(g^d), ~g\in SL(r,\mathbb {C})
is irreducible in the ring of regular functions of
S
L
(
r
,
C
)
SL(r,\mathbb {C})
.