This paper introduces the Riemann Assembly, beginning from the screw formula P (u) =e−kue−i2πuP (u) =e^-kue^-i2 uP (u) =e−kue−i2πu. The carrier is sampled logarithmically at un=tlogn/ (2π) uₙ=t n/ (2) un=tlogn/ (2π), and the contraction parameter is coupled by k=2πσ/tk=2/tk=2πσ/t. Under this sampling and coupling, the generated term becomes P (un) =n− (σ+it) P (uₙ) =n^- (+it) P (un) =n− (σ+it), so the generated series is R (s) =∑n=1∞n−sR (s) =₍=₁^n^-sR (s) =∑n=1∞n−s. The paper records the internal bound structure of the assembly, the projected form of its bounded assembly set, and a supplementary theta-completed lift with a z-pin exclusion condition for full lifted reflected closure.
Savvas Papadopoulos (Mon,) studied this question.