AbstractThis article presents a family of irreducible, palindromic polynomials with integer coefficients,ranging in degree from 6 to 62. For each polynomial, the associated Salemnumber – a real algebraic integer greater than 1 whose remaining conjugates lie on orinside the unit circle – is computed. The polynomials satisfy the defining criteria of Salempolynomials: irreducibility over Z, palindromicity, exactly one root outside the unit circle,and all remaining roots on the unit circle. The computations were performed using Sage-Math, with algorithmic assistance from DeepSeek. The discovery stems from an originalapproach by the author.
Helmdach et al. (Tue,) studied this question.
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