Part X: Lemniscate Characters
Part VII earned the algebraic lemniscate 𝕃 as the bipolar spectral algebra H_τ = A_τ^(B) × A_τ^(C) (Chapter [ch:bipolar-algebra]), and Part IX…
Part Overview
Part VII earned the algebraic lemniscate 𝕃 as the bipolar spectral algebra H_τ = A_τ^(B) × A_τ^(C) , and Part IX constructed the full profinite boundary ring ℤ_τ with its split-complex extension ℤ_τ[j] (Chapters –).
This Part develops the character theory of 𝕃: ring homomorphisms from the bipolar spectral algebra into the split-complex scalars. The fundamental characters χ_+ and χ_- project onto the B-sector and C-sector respectively, and the full character group classifies all the ways 𝕃 interacts with its scalar ring.
The spectral decomposition theorem gives a canonical decomposition of every element of 𝕃 into B-sector and C-sector components. The crossing point — the algebraic locus where the two sectors meet — is analyzed as a singular point whose local structure reflects the bipolar polarity of primes. Finally, the bipolar Fourier transform provides a formal framework for harmonic analysis on 𝕃, previewing the central role that lemniscate characters play in the Central Theorem of Book II.
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