Enumerative Galois theory for cubics and quartics
Sam Chow, Rainer Dietmann
Abstract
We show that there are Oε(H1.5+ε) monic, cubic polynomials with integer coefficients bounded by H in absolute value whose Galois group is A3. We also show that the order of magnitude for D4 quartics is H2(logH)2, and that the respective counts for A4, V4, C4 are O(H2.91), O(H2logH), O(H2logH). Our work establishes that irreducible non-S3 cubic polynomials are less numerous than reducible ones, and similarly in the quartic setting: these are the first two solved cases of a 1936 conjecture made by van der Waerden.
Topics & Concepts
MathematicsPure mathematicsAlgebra over a fieldAlgebraic Geometry and Number TheoryCommutative Algebra and Its ApplicationsPolynomial and algebraic computation