HOW DOES THE DISCRIMINANT OF INTEGER POLYNOMIALS DEPEND ON THE DISTRIBUTION OF ROOTS?

Let n ∈ N be fixed, Q > 1 be some natural parameter, and Pn(Q) denote the set of integer polynomials of degree n and height of at most Q. Given a polynomial P(x) = anx n + · · · + a0 ∈ Z[x] of degree n, the discriminant of P(x) is defined by D(P) = a 2n−2 n ∏ 16i< |D(P)| 6 Q 2n−2−2v . The first results for the estimate of the number of polynomials with given discriminants were received by H. Davenport in 1961, which were crucial to the solving of the problem of Mahler. In this paper for the first time we obtain the exact upper and lower bounds for #P3(Q, v) with the additional condition on the distribution of the roots of the polynomials. It is interesting that the value of #Pn(Q, v) has the largest value when all the roots of polynomials are close to each other. If there are only k, 2 6 k < n, close roots to each other then the value of #Pn(Q, v) will be less.

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