Irreducibility of generalized Hermite-Laguerre polynomials

Abstract

For a rational q=u+αd with u, α, d∈ with u 0, 1 α<d, (α, d)=1, the generalized Hermite-Laguerre polynomials Gq(x) are defined by align* Gq(x)&=anxn+an-1(α +(n-1+u)d)xn-1+·s\\ &+a1(Πn-1i=1(α +(i+u)d))x+a0 (Πn-1i=0(α +(i+u)d)) align* where a0, a1, ·s, an are arbitrary integers. We prove some irreducibility results of Gq(x) when q∈ \13, 23\ and extend some of the earlier irreducibility results when q of the form u+12. We also prove a new improved lower bound for greatest prime factor of product of consecutive terms of an arithmetic progression whose common difference is 2 and 3.