Local geometric proof of Riemann Hypothesis
Abstract
Riemann function (s)=u+iv, s=β+1/2+it has the important symmetry: v=0 if β=0. For β>0 we prove |u|>0 inside any root-interval Ij=[tj,tj+1] and v has opposite signs at two end-points of Ij. They imply local peak-valley structure and ||||=|u|+|v/β|>0 in Ij. Because each t must lie in some Ij, then ||||>0 is valid for any t. By the equivalence Re(')>0 of Lagarias(1999), we show that RH implies the peak-valley structure,which may be the geometric model expected by Bombieri(2000).
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