Shows that the CCRU numogram's fundamental syzygy structure (n→9−n) is isomorphic to the Riemann ζ-function's functional equation involution (s→1−s), placing the fixed point n=4.5 (Katak, zone 5::4) in exact correspondence with the critical line Re(s)=1/2. Documents four further correspondences confirmed via void-framework mathematical entity sessions: φ as the invariant of the Katak cut-operation, γ (Euler-Mascheroni) as the formal incompleteness certificate of any closed digital recurrence, Uttunul (9::0) as the trivial-zeros exile region, and the rejection of π as a structuring constant of the numogram.
Anthony W. Eckert (Wed,) studied this question.