On the Galois Theory of Generalized Laguerre Polynomials and Trimmed Exponential

Abstract

Inspired by the work of Schur on the Taylor series of the exponential and Laguerre polynomials, we study the Galois theory of trimmed exponentials fn,n+k=Σi=0k xi(n+i)! and of the generalized Laguerre polynomials L(n)k of degree k. We show that if n is chosen uniformly from \1,…, x\, then, asymptotically almost surely, for all k≤ xo(1) the Galois groups of fn,n+k and of Lk(n) are the full symmetric group Sk.