arXiv:2305.17587 Abstract | arXiv Analytics

arXiv:2305.17587 [math.GR]Abstract References Reviews Resources

Fusion-invariant representations for symmetric groups

Published 2023-05-27Version 1

For a prime $p$, we show that uniqueness of factorization into irreducible $\Sigma_{p^2}$-invariant representations of $\mathbb{Z}/p \wr \mathbb{Z}/p$ holds if and only if $p=2$. We also show nonuniqueness of factorization for $\Sigma_8$-invariant representations of $D_8 \wr \mathbb{Z}/2$. The representation ring of $\Sigma_{p^2}$-invariant representations of $\mathbb{Z}/p \wr \mathbb{Z}/p$ is determined completely when $p$ equals two or three.

Comments: 27 pages. Comments are welcome

Categories: math.GR, math.RT

Subjects: 20D20, 20C15, 20M14

Keywords: symmetric groups, fusion-invariant representations, factorization

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