Abstract: Around 1900 Young and Frobenius (independently, and through very different techniques) obtained a formula for the dimensions of the irreducible representations of the symmetric group. Some 53 years later, Frame, Robinson and Thrall noticed that the Young-Frobenius formula simplified into the now famous hook length formula. Nowadays there are many proofs, but the hook length formula remains something of a mystery, as if some deeper understanding lies just out of reach. One aspect of this mystery is that none of the proofs seem to indicate how one might come up with the formula in the first place, other than just guessing. I will attempt to answer that question. It is an improbable tale that meanders through scenes of Young symmetrizers, Schur-Weyl duality, Weyl algebras, elementary combinatorics, and Plücker relations. All because Google's AI gave me a very obviously wrong answer when I was trying to find out the square of a Young symmetrizer. There will be a pre-seminar presenting relevant background at beginning graduate level starting at 1:30pm in MC 5417. |
Thursday, June 11, 2026 2:30 pm
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3:30 pm
EDT (GMT -04:00)