Add to ORKGThe purpose of this paper is to derive the Hasse-Weil zeta function of a special class of Algebraic varieties based on a generalization of the Markoff equation. We count the number of solutions to generalized Markoff equations over finite fields first by using the group structure of the set of automorphisms that generate solutions and in other cases by applying a slicing method from the two-dimensional cases. This enables us to derive a generating function for the number of solutions over the degree k extensions of a fixed finite field giving us the local zeta function. We then create an Euler product of our local zeta functions for fields of prime order for all prime numbers similar to the derivation of the Riemann-zeta function
En esta tesis se extienden resultados de A. N. Kochubei sobre ecuaciones parabólicas p-ádicas y proc...
AbstractWe describe a method which may be used to compute the zeta function of an arbitrary Artin-Sc...
The Test Function Conjecture due to Haines and Kottwitz predicts that the geometric Bernstein center...
This work is a review of the congruent zeta function and the Weil conjectures for non-singular curv...
Sets definable over finite fields are introduced. The rationality of the logarithmic derivative of ...
Thesis (Ph. D.)--University of Rochester. Dept. of Mathematics, 2016.Zeta functions of varieties ove...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
In this dissertation we deal with the distribution of zeros of special values of Goss zeta functions...
We study the solutions of the Rosenberg–Markoff equation ax2 + by2 + cz2 = dxyz (a generalization of...
AbstractThis article is all about two theorems on equations over finite fields which have been prove...
In this paper, we improve the algorithms of Lauder-Wan \cite{LW} and Harvey \cite{Ha} to compute the...
A new method is devised for calculating the Igusa local zeta function Z_f of a polynomial f(x_1,,,,,...
We introduce a new algorithm to compute the zeta function of a curve over a finite field. This metho...
En esta tesis se extienden resultados de A. N. Kochubei sobre ecuaciones parabólicas p-ádicas y proc...
AbstractWe describe a method which may be used to compute the zeta function of an arbitrary Artin-Sc...
The Test Function Conjecture due to Haines and Kottwitz predicts that the geometric Bernstein center...
This work is a review of the congruent zeta function and the Weil conjectures for non-singular curv...
Sets definable over finite fields are introduced. The rationality of the logarithmic derivative of ...
Thesis (Ph. D.)--University of Rochester. Dept. of Mathematics, 2016.Zeta functions of varieties ove...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
In this dissertation we deal with the distribution of zeros of special values of Goss zeta functions...
We study the solutions of the Rosenberg–Markoff equation ax2 + by2 + cz2 = dxyz (a generalization of...
AbstractThis article is all about two theorems on equations over finite fields which have been prove...
In this paper, we improve the algorithms of Lauder-Wan \cite{LW} and Harvey \cite{Ha} to compute the...
A new method is devised for calculating the Igusa local zeta function Z_f of a polynomial f(x_1,,,,,...
We introduce a new algorithm to compute the zeta function of a curve over a finite field. This metho...
En esta tesis se extienden resultados de A. N. Kochubei sobre ecuaciones parabólicas p-ádicas y proc...
AbstractWe describe a method which may be used to compute the zeta function of an arbitrary Artin-Sc...
The Test Function Conjecture due to Haines and Kottwitz predicts that the geometric Bernstein center...