Sur l'infimum des parties réelles des zéros des sommes partielles de la fonction zêta de Riemann
Language
fr
Article de revue
This item was published in
Comptes Rendus. Mathématique. 2009-04, vol. 347, p. p. 343-346
Académie des sciences (Paris)
English Abstract
The greatest lower bound of the real parts of the roots of a partial sum of the Dirichlet series of Riemann's zeta function is asymptotically equivalent to the opposite of the number of terms of this sum, multiplied by the ...Read more >
The greatest lower bound of the real parts of the roots of a partial sum of the Dirichlet series of Riemann's zeta function is asymptotically equivalent to the opposite of the number of terms of this sum, multiplied by the Napierian logarithm of 2, when this number of terms tends to infinity.Read less <
Origin
Hal imported