Fusion-invariant representations for symmetric groups
Abstract
For a prime p, we show that uniqueness of factorization into irreducible p2-invariant representations of Z/p Z/p holds if and only if p=2. We also show nonuniqueness of factorization for 8-invariant representations of D8 Z/2. The representation ring of p2-invariant representations of Z/p Z/p is determined completely when p equals two or three.
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