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I have a little problem in representation and/or invariant theory which I need help with.

Let's assume $G \leq \mathbb{C}^{n\times n}$ is a finite complex matrix group which operates linearly via $gp\mapsto p \circ g^{-1}$ on the vectorspace of polynomials over $\mathbb{C}$ in $n$ variables and I am given a natural number $k$. How do I compute the character of the corresponding representation if I restrict the operation to the finitely generated vectorspace of homogeneous polynomials of degree $k$? I already know the character of the given $n$-dimensional representation.

Any help would be greatly appreciated.

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    Are the elements of $G$ diagonalizable?2012-02-21
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    Since $G$ is a finite matrix group over an algebraicaly closed field of characteristic $0$ the elements should be diagonalizable by default. I should note that I have an explicit example but just computing the character is not an option since $n=248$ and the order of the group is $2^{15}\cdot 3^{10}\cdot ...$.2012-02-21
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    is it not enough to give the character in terms of the eigenvalues of the element?2012-02-21
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    If $g\in G$ has eigenvalues $\lambda_i$, then its action on the polynomials has eigenvalues $\lambda_i^{-1}$, and its eigenvalues on the $k$th homogeneous piece are just $k$-fold combinations of these: $\lambda_{i_1}^{-1}\cdots\lambda_{i_k}^{-1}$, where the $i_j$ are not necessarily distinct.2012-02-21
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    That is definitely correct but I was hoping to a achieve a (perhaps polynomial) term in the character of the $n$-dimensional representation.2012-02-22

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