The structure of the double discriminant
Abstract
For a polynomial f(x) = Σi=0n ai xi, we study the double discriminant DDn,k = discak discx f(x). This object has been well studied in algebraic geometry, but has been brought to recent prominence in number theory by its key role in the proof of the Bhargava--van der Waerden theorem. We bridge the knowledge gap for this object by proving an explicit factorization: DDn,k is the product of a square, a cube, and possibly a linear monomial. Our proof is entirely algebraic. We also investigate other aspects of this factorization.
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