An Anti-Symmetric Structure of the Riemann Xi Function: The Complete Equivalence Chain and the Gap We prove that the logarithmic derivative of the completed Riemann xi function satisfies an exact anti-symmetry about the critical line: Rexi'/xi(sigma+it) = -Rexi'/xi((1-sigma)+it) for all sigma, t in R. This odd symmetry theorem follows in one line from the functional equation and organises the known equivalences of the Riemann Hypothesis into a complete eight-link chain: RH is equivalent to Rexi'/xi > 0 for sigma > 1/2, which is equivalent to |xi| monotone, which is equivalent to kappa = 0, which is equivalent to w(ell) >= 0, which is equivalent to Connes positivity, which is equivalent to = 0. The monotonicity equivalence was proved by Sondow and Dumitrescu (2010); the odd symmetry is new and provides its organising principle. We analyse the resulting gap strip sigma in (1/2, 7/12), width 1/12, proving three unconditional results: the outer boundary Delta E > 0 for sigma > 7/12 (from the Heath-Brown density theorem), the symmetric pair reinforcement theorem (hypothetical off-critical zeros within the density-allowed band reinforce rather than undermine the sign), and the self-consistency of the gap width. Three paths to close the gap are stated as open problems. Note on independent derivation: the monotonicity equivalence was derived independently by the author as part of the MNZI programme; the prior work of Sondow and Dumitrescu was identified during preparation of this manuscript for submission.
Paul Buchanan (Sun,) studied this question.