Paratrophic Determinants over Z/NZ via Discrete Fourier Transform
Abstract
In this note, we investigate the paratrophic determinants attached to the multiplicative semigroup Z/NZ. We show that, via discrete Fourier, cosine, and sine transforms, these determinants factor into products of group determinants indexed by d|N. This yields explicit formulas for several determinant families, including determinants involving periodic Bernoulli functions and powers of the tangent function. As an application, we also prove a corrected version of a conjecture of Sun Zhi-Wei.
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