Diagonal supersymmetry for coinvariant rings
Abstract
For finite groups G, we show that bosonic-fermionic coinvariant rings have a natural U(gl(k|j)) C[G]-module structure. In particular, we show that their character series are sums of super Schur functions sλ(q/u) times irreducible characters of G with universal coefficients, which do not depend on k,j. In the case where G is the symmetric group with diagonal action, this proves the "Diagonal Supersymmetry" conjecture of F. Bergeron (2020).
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