Add to ORKGMI: Global COE Program Education-and-Research Hub for Mathematics-for-IndustryグローバルCOEプログラム「マス・フォア・インダストリ教育研究拠点」We establish \u22higher depth\u22 analogues of regularized determinants due to Milnor for the zeros of Hecke L-functions. This is an extension of the result of Deninger about the regularized determinant for the zeros of the Riemann zeta function
Abstract. De Bruijn and Newman introduced a deformation of the Riemann zeta function ζ(s), and found...
We improve the currently known lower bounds for the discriminant of a number field without assuming ...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...
Global COE Program Education-and-Research Hub for Mathematics-for-IndustryグローバルCOEプログラム「マス・フォア・インダスト...
<p>The project aims at computing Riemann&#39;s zeroes with high accuracy through...
Questions regarding the behavior of the Riemann zeta function on the critical line 1/2 + it can be n...
Since Euler and Riemann, various links have been established between the behaviour of prime numbers ...
The Riemann hypothesis is an unsolved problem in mathematics involving the locations of the non-tr...
AbstractAn alternative to Plemelj-Smithies formulas for the p-regularized quantities d(p)(K) and D(p...
ABSTRACT. We study a subtle inequity in the distribution of unnormalized differences between imagina...
The zeros of Dirichlet L-functions for various moduli and characters are being computed with very hi...
AbstractWe explore the extent to which a variant of a celebrated formula due to Jost and Pais, which...
In this dissertation, we established that in average taken over the family of all Hecke L-functions...
Some brackets in Tables 2-7 became blank spaces in final print.International audienceWe describe in ...
In mathematics still exist a lot of unproven theorems and one of them is Riemann hypothesis about ze...
Abstract. De Bruijn and Newman introduced a deformation of the Riemann zeta function ζ(s), and found...
We improve the currently known lower bounds for the discriminant of a number field without assuming ...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...
Global COE Program Education-and-Research Hub for Mathematics-for-IndustryグローバルCOEプログラム「マス・フォア・インダスト...
<p>The project aims at computing Riemann&#39;s zeroes with high accuracy through...
Questions regarding the behavior of the Riemann zeta function on the critical line 1/2 + it can be n...
Since Euler and Riemann, various links have been established between the behaviour of prime numbers ...
The Riemann hypothesis is an unsolved problem in mathematics involving the locations of the non-tr...
AbstractAn alternative to Plemelj-Smithies formulas for the p-regularized quantities d(p)(K) and D(p...
ABSTRACT. We study a subtle inequity in the distribution of unnormalized differences between imagina...
The zeros of Dirichlet L-functions for various moduli and characters are being computed with very hi...
AbstractWe explore the extent to which a variant of a celebrated formula due to Jost and Pais, which...
In this dissertation, we established that in average taken over the family of all Hecke L-functions...
Some brackets in Tables 2-7 became blank spaces in final print.International audienceWe describe in ...
In mathematics still exist a lot of unproven theorems and one of them is Riemann hypothesis about ze...
Abstract. De Bruijn and Newman introduced a deformation of the Riemann zeta function ζ(s), and found...
We improve the currently known lower bounds for the discriminant of a number field without assuming ...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...