Irreducibility of extensions of Laguerre Polynomials
Abstract
For integers a0,a1,…,an with |a0an|=1 and either α =u with 1≤ u ≤ 50 or α=u+ 12 with 1 ≤ u ≤ 45, we prove that n(α)(x;a0,a1,·s,an) is irreducible except for an explicit finite set of pairs (u,n). Furthermore all the exceptions other than n=212,α=89/2 are necessary. The above result with 0≤α ≤ 10 is due to Filaseta, Finch and Leidy and with α ∈ \-1/2,1/2\ due to Schur.
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