Prime Fourier Embeddings provide a group-theoretic basis for integer representations in which modular arithmetic becomes channel selection, with Schur's lemma guaranteeing block-diagonal equivariant maps and empirical confirmation of prime-channel specialization on square-free moduli.
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Prime Fourier Embeddings: A Principled Basis for Modular Arithmetic
Prime Fourier Embeddings provide a group-theoretic basis for integer representations in which modular arithmetic becomes channel selection, with Schur's lemma guaranteeing block-diagonal equivariant maps and empirical confirmation of prime-channel specialization on square-free moduli.