On the nontrivial zeros of the Dirichlet eta function

Abstract

We construct a two-parameter complex function η :C C, ∈ (0, ∞), ∈ (0,∞) that we call a holomorphic nonlinear embedding and that is given by a double series which is absolutely and uniformly convergent on compact sets in the entire complex plane. The function η converges to the Dirichlet eta function η(s) as ∞. We prove the crucial property that, for sufficiently large , the function η (s) can be expressed as a linear combination η (s)=Σn=0∞an() η(s+2 n) of horizontal shifts of the eta function (where an() ∈ R and a0=1) and that, indeed, we have the inverse formula η(s)=Σn=0∞bn() η (s+2 n) as well (where the coefficients bn() ∈ R are obtained from the an's recursively). By using these results and the functional relationship of the eta function, η(s)=λ(s)η(1-s), we sketch a proof of the Riemann hypothesis which, in our setting, is equivalent to the fact that the nontrivial zeros s*=σ*+it* of η(s) (i.e. those points for which η(s*)=η(1-s*)=0) are all located on the critical line σ*=12.