On the Structure of the Classical Discriminant

Consider a general polynomial of degree n with variable coeﬃcients. It is known that the Newton polytope of its discriminant is combinatorially equivalent to an (n 1)-dimensional cube. We show that two facets of this Newton polytope are prisms, and that truncations of the discriminant with respect to facets factor into discriminants of polynomials of smaller degree.

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general algebraic equation discriminant Newton polytope.

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Прикладные науки. Медицина. Технология

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Физико-математические науки

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On the Structure of the Classical Discriminant

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