A Short Proof of Gamas's Theorem
Abstract
If λ is the irreducible character of the symmetric group Sn corresponding to the partition λ of n then we may symmetrize a tensor v1 ... vn by λ. Gamas's theorem states that the result is not zero if and only if we can partition the set vi into linearly independent sets whose sizes are the parts of the transpose of λ. We give a short and self-contained proof of this fact.
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