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Weil conjectures
Etale and Crystalline Companions, I
DENINGER COHOMOLOGY THEORIES Readers Who Know What the Standard Conjectures Are Should Skip to Section 0.6. 0.1. Schemes. We
Introduction to L-Functions: the Artin Cliffhanger…
THE WEIL CONJECTURES I Arxiv:1807.10810V2 [Math.AG] 26
The Role of the Ramanujan Conjecture in Analytic Number Theory
Hasse-Weil Zeta-Function in a Special Case
Motives and Motivic L-Functions
Deligne's Proof of the Weil-Conjecture
The Riemann Hypothesis for Varieties Over Finite Fields
The Weil Conjectures for Elliptic Curves
A Course on the Weil Conjectures
Etale Cohomology and the Weil Conjecture by Eberhard Freitag and Reinhardt Kiehl
Arxiv:1603.09556V1 [Math.NT]
Lecture 3. the Statements of the Weil Conjectures
Supersymmetric Flux Compactifications and Calabi-Yau
The Weil Conjectures
Arxiv:1806.03216V3 [Math.AG] 2 Sep 2020 TNADCNETRSFRAEINFOURFOLDS ABELIAN for CONJECTURES STANDARD .Goercexamples References Geometric Proof the of A
The Weil Conjectures
Top View
Pierre Deligne Institute for Advanced Study, Princeton, New Jersey, USA
THE WEIL CONJECTURES for CURVES Contents 1. Zeta Functions and Weil Conjectures 1 2. Rationality and the Functional Equation
Notes on the Weil Conjectures
Trying to Understand Deligne's Proof of the Weil Conjectures
1 Elliptic Curves Over Finite Fields 1.1 Introduction Definition 1.1
Learning Seminar on Deligne's Weil II Theorem
[Math.NT] 20 Jul 2005 Fourier Transforms and P-Adic “Weil
CHAPTER 2. POINTS OVER FINITE FIELDS and the WEIL CONJECTURES Contents 1. Varieties Over Finite Fields 1 2. the Local Weil Zeta
Compatibility of Local and Global Langlands Correspondences
Notes on the Generalized Ramanujan Conjectures
THE WEIL ZETA FUNCTION and the IGUSA LOCAL ZETA FUNCTION 1. Introduction in the Next Four Lectures I Want to Discuss Two Zeta Fu
Arxiv:1808.00119V3 [Math.AG] 26 Nov 2020
Remark on Weil's Conjectures
Arxiv:1707.04248V4 [Math.AG]
Zeta Functions in Algebraic Geometry Mircea Mustat˘A
L-Functions and Monodromy: Four Lectures on Weil II-1
The Weil Conjectures NAW 5/15 Nr
18.783 Elliptic Curves Spring 2013 Problem Set #7 Due: 04/09/2013
The Weil Conjectures Reviewed by Brian Hayes
Miscellaneous Preliminaries on Arithmetic Geometry
Weil Conjectures Exposition
The Riemann Hypothesis Over Finite Fields from Weil to the Present Day
The Weil Conjecture and Analogues in Complex Geometry
New Frontiers in Langlands Reciprocity
18.782 Introduction to Arithmetic Geometry Fall 2020 Lecture #37 12/7/2020
The Riemann Hypothesis
Lecture 4. the Weil Conjectures for Curves
Langlands Program and Ramanujan Conjecture: a Survey
Lecture 1: Weil Conjectures and Motivation
Compatibility of Local and Global Langlands Correspondences
Lecture 5. Weil Cohomology Theories and the Weil Conjectures