Gaps in binary cyclotomic polynomials
Abstract
For odd prime numbers p < q, let pq ∈ Z[X] be the binary cyclotomic polynomial of order pq. In this paper, we prove that the second gap of pq is the maximum of r-1 and p-r-1, where r is the remainder of q divided by p. For q congruent to 1 modulo p, we determine the number of gaps for each possible length. To obtain these results, we develop a new approach in which the coefficients of pq are described as concatenations of words arising from iterations of a circular map.
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