On the Factorization of lacunary polynomials
Abstract
This paper addresses the factorization of polynomials of the form F(x) = f0(x) + f1(x) xn + ·s + fr-1(x) x(r-1)n + fr(x) xrn where r is a fixed positive integer and the fj(x) are fixed polynomials in Z[x] for 0 j r. We provide an efficient method for showing that for n sufficiently large and reasonable conditions on the fj(x), the non-reciprocal part of F(x) is either 1 or irreducible. We illustrate the approach including giving two examples that arise from trace fields of hyperbolic 3-manifolds.
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