Irreducibility and Galois Groups of Generalized Laguerre Polynomials Ln(-1-n-r)(x)

Abstract

We study the algebraic properties of Generalized Laguerre polynomials for negative integral values of a given parameter which is Ln(-1-n-r)(x)= Σj=0n n-j+rn-j xjj! for integers r≥ 0, n≥ 1. For different values of parameter r, this family provides polynomials which are of great interest. Hajir conjectured that for integers r≥ 0 and n≥ 1, Ln(-1-n-r)(x) is an irreducible polynomial whose Galois group contains An, the alternating group on n symbols. Extending earlier results of Schur, Hajir, Sell, Nair and Shorey, we confirm this conjecture for all r≤ 60. We also prove that Ln(-1-n-r)(x) is an irreducible polynomial whose Galois group contains An whenever n>er(1+1.2762 log r).