Full Galois groups of polynomials with slowly growing coefficients

IF 0.8 3区数学 Q2 MATHEMATICS

Bulletin of the London Mathematical Society Pub Date : 2025-02-04 DOI:10.1112/blms.70008

Lior Bary-Soroker, Noam Goldgraber

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引用次数: 0

Abstract

Choose a polynomial $f$ uniformly at random from the set of all monic polynomials of degree $n$ with integer coefficients in the box ${[- L, L]}^{n}$ . The main result of the paper asserts that if $L = L (n)$ grows to infinity, then the Galois group of $f$ is the full symmetric group, asymptotically almost surely, as $n \to \infty$ . When $L$ grows rapidly to infinity, say $L > n^{7}$ , this theorem follows from a result of Gallagher. When $L$ is bounded, the analog of the theorem is open, while the state-of-the-art is that the Galois group is large in the sense that it contains the alternating group (if $L < 17$ , it is conditional on the Extended Riemann Hypothesis). Hence the most interesting case of the theorem is when $L$ grows slowly to infinity. Our method works for more general independent coefficients.