Un exemple de somme de s\'erie de vecteurs propres \`a valeurs propres de module un, non r\'ecurrente

Abstract

Let ζ*(s)=Σn=1+∞(-1)n/ns and τ the operator defined on the Frechet space of holomorphic functions in \s∈ C :1/2< Re \, s<1\ by τ f(s)= f(s-2iπ/ 2). We show that the Riemann Hypothesis is equivalent to the strong recurrence of ζ*(s) for τ. It follows that a sufficient condition for RH would be that every sum of a series of eigenvectors with unimodular eigenvalues for an operator u is strongly recurrent for u. But we give a counterexample showing that it is not the case.