Affiliation:
1. Department of Mathematics , IISER Pune , Dr. Homi Bhabha Road, Pashan , Pune 411 008 India
Abstract
Abstract
In this paper, we compute powers in the wreath product
G
≀
S
n
G\wr S_{n}
for any finite group 𝐺.
For
r
≥
2
r\geq 2
a prime, consider
ω
r
:
G
≀
S
n
→
G
≀
S
n
\omega_{r}\colon G\wr S_{n}\to G\wr S_{n}
defined by
g
↦
g
r
g\mapsto g^{r}
.
Let
P
r
(
G
≀
S
n
)
:=
|
ω
r
(
G
≀
S
n
)
|
|
G
|
n
n
!
P_{r}(G\wr S_{n}):=\frac{\lvert\omega_{r}(G\wr S_{n})\rvert}{\lvert G\rvert^{n}n!}
be the probability that a randomly chosen element in
G
≀
S
n
G\wr S_{n}
is an 𝑟-th power.
We prove
P
r
(
G
≀
S
n
+
1
)
=
P
r
(
G
≀
S
n
)
P_{r}(G\wr S_{n+1})=P_{r}(G\wr S_{n})
for all
n
≢
-
1
(
mod
r
)
n\not\equiv-1\ (\mathrm{mod}\ r)
if the order of 𝐺 is coprime to 𝑟.
We also give a formula for the number of conjugacy classes that are 𝑟-th powers in
G
≀
S
n
G\wr S_{n}
.
Subject
Algebra and Number Theory
Cited by
1 articles.
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