Irreducibility of random polynomials: general measures

Abstract

Let μ be a probability measure on Z that is not a Dirac mass and that has finite support. We prove that if the coefficients of a monic polynomial f(x)∈Z[x] of degree n are chosen independently at random according to μ while ensuring that f(0)≠0, then there is a positive constant θ=θ(μ) such that f(x) has no divisors of degree θ n with probability that tends to 1 as n∞. Furthermore, in certain cases, we show that a random polynomial f(x) with f(0)≠0 is irreducible with probability tending to 1 as n∞. In particular, this is the case if μ is the uniform measure on a set of at least 35 consecutive integers, or on a subset of [-H,H] of cardinality H4/5( H)2 with H sufficiently large. In addition, in all of these settings, we show that the Galois group of f(x) is either An or Sn with high probability. Finally, when μ is the uniform measure on a finite arithmetic progression of at least two elements, we prove a random polynomial f(x) as above is irreducible with probability δ for some constant δ=δ(μ)>0. In fact, if the arithmetic progression has step 1, we prove the stronger result that the Galois group of f(x) is An or Sn with probability δ.