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Semi-invariants of Binary Forms and Sylvesters Theorem

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 نشر من قبل William Y. C. Chen
 تاريخ النشر 2020
  مجال البحث
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We obtain a combinatorial formula related to the shear transformation for semi-invariants of binary forms, which implies the classical characterization of semi-invariants in terms of a differential operator. Then, we present a combinatorial proof of an identity of Hilbert, which leads to a relation of Cayley on semi-invariants. This identity plays a crucial role in the original proof of Sylvesters theorem on semi-invariants in connection with the Gaussian coefficients. Moreover, we show that the additivity lemma of Pak and Panova which yields the strict unimodality of the Gaussian coefficients for $n,k geq 8$ can be deduced from the ring property of semi-invariants.



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