Towards van der Waerden's conjecture

Abstract

How often is a quintic polynomial solvable by radicals? We establish that the number of such polynomials, monic and irreducible with integer coefficients in [-H,H], is O(H3.91). More generally, we show that if n 3 and n \ 7, 8, 10 \ then there are O(Hn-1.017) monic, irreducible polynomials of degree n with integer coefficients in [-H,H] and Galois group not containing An. Save for the alternating group and degrees 7,8,10, this establishes a 1936 conjecture of van der Waerden.

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