What is the Riemann Hypothesis?
This video provides a basic introduction to the Riemann Hypothesis based on the the superb book 'Prime Obsession' by John Derbyshire. Along the way I look at convergent and divergent series, Euler's famous solution to the Basel problem, and the Riemann-Zeta function. Analytic continuation
From playlist Mathematics
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From playlist SELF
Richard Swinburne - What is God's Eternity?
Free access to Closer to Truth's library of 5,000 videos: http://bit.ly/2UufzC7 Could God be eternal? For God to be eternal, God would exist outside of time, would not experience time's flow. God would have no past, present or future. As Boethius said in the 6th Century, "Eternity, then,
From playlist Big Questions About God - Closer To Truth - Core Topic
A (compelling?) reason for the Riemann Hypothesis to be true #SOME2
A visual walkthrough of the Riemann Zeta function and a claim of a good reason for the truth of the Riemann Hypothesis. This is not a formal proof but I believe the line of argument could lead to a formal proof.
From playlist Summer of Math Exposition 2 videos
The Most Difficult Math Problem You've Never Heard Of - Birch and Swinnerton-Dyer Conjecture
The Birch and Swinnerton-Dyer Conjecture is a millennium prize problem, one of the famed seven placed by the Clay Mathematical Institute in the year 2000. As the only number-theoretic problem in the list apart from the Riemann Hypothesis, the BSD Conjecture has been haunting mathematicians
From playlist Math
Here's a re-enactment of the famous paradox known as the "infinite monkey theorem."
From playlist Cosmic Journeys
Russell Stannard - What is God's Eternity?
Free access to Closer to Truth's library of 5,000 videos: http://bit.ly/2UufzC7 Could God be eternal? For God to be eternal, God would exist outside of time, would not experience time's flow. God would have no past, present or future. As Boethius said in the 6th Century, "Eternity, then,
From playlist Big Questions About God - Closer To Truth - Core Topic
Iuliia Semikina: The decomposition conjecture for G-theory
The lecture was held within the framework of the Hausdorff Trimester Program: K-Theory and Related Fields. Iuliia Semikina: The decomposition conjecture for G-theory Abstract: The G-theory of a noetherian ring R is defined as Quillen's K-theory of the category of finitely generated R-mod
From playlist HIM Lectures: Trimester Program "K-Theory and Related Fields"
Some identities involving the Riemann-Zeta function.
After introducing the Riemann-Zeta function we derive a generating function for its values at positive even integers. This generating function is used to prove two sum identities. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist The Riemann Zeta Function
Venerable Dr. Yifa - How Should We Think About God's Existence?
God exists? God does not exist? What kinds of Gods? It's no challenge to find flaws and fallacies on all sides. Can we step away from old arguments and ask how to approach God's existence? What's the process? What's the way of thinking? What are issues, problems, questions about God and Go
From playlist Big Questions About God - Closer To Truth - Core Topic
Counting Woodin cardinals in HOD
Distinguished Visitor Lecture Series Counting Woodin cardinals in HOD W. Hugh Woodin Harvard University, USA and University of California, Berkeley, USA
From playlist Distinguished Visitors Lecture Series
Growth of finitely generated groups and related topics by (Lecture - 03) by Rostislav Grigorchuk
Geometry, Groups and Dynamics (GGD) - 2017 DATE: 06 November 2017 to 24 November 2017 VENUE: Ramanujan Lecture Hall, ICTS, Bengaluru The program focuses on geometry, dynamical systems and group actions. Topics are chosen to cover the modern aspects of these areas in which research has b
From playlist Geometry, Groups and Dynamics (GGD) - 2017
[BOURBAKI 2017] 21/10/2017 - 2/4 - Simon RICHE
La théorie de Hodge des bimodules de Soergel [d'après Soergel et Elias-Williamson] ---------------------------------- Vous pouvez nous rejoindre sur les réseaux sociaux pour suivre nos actualités. Facebook : https://www.facebook.com/InstitutHenriPoincare/ Twitter : https://twitter.com/In
From playlist BOURBAKI - 2017
Nathaël Gozlan : Ehrard’s inequality and hypercontractivity of Ornstein-Ulheinbeck semigroup
Recording during the thematic meeting : "Geometrical and Topological Structures of Information" the August 28, 2017 at the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent
From playlist Geometry
Raphaël Beuzart Plessis - Comparaisons de caractères relatifs locaux...
Comparaisons de caractères relatifs locaux et la conjecture d' Ichino - Ikeda pour les groupes unitaires Les conjectures globales de Gan, Gross et Prasad relient la non -annulation de certaines fonctions L de Rankin-Selberg en leur centre de symétrie à celle de périodes automorphes (intég
From playlist Reductive groups and automorphic forms. Dedicated to the French school of automorphic forms and in memory of Roger Godement.
Paul Wedrich: Knots and quivers, HOMFLY and DT
The lecture was held within the framework of the Hausdorff Trimester Program: Symplectic Geometry and Representation Theory. Abstract: Physicists have long been arguing that gauge theories at large rank are related to topolog- ical string theories. As a concrete example, I will describe a
From playlist HIM Lectures: Trimester Program "Symplectic Geometry and Representation Theory"
Karsten GROVE - Positive curvature and beyond: A status report and future peek
We will provide an overview of some of the main results around manifolds with positive and non-negative sectional curvature and discuss established and evolving approaches to the area.
From playlist Riemannian Geometry Past, Present and Future: an homage to Marcel Berger
Mod-08 Lec-36 The Vaisesika Philosophy - V
Indian Philosophy by Dr. Satya Sundar Sethy, Department of Humanities and Social Sciences, IIT Madras. For more details on NPTEL visit http://nptel.iitm.ac.in
From playlist IIT Madras: Introduction to Indian Philosophy | CosmoLearning.org Philosophy
Gregory A. Boyd - What is Immortality
Click here for more interviews from Greg Boyd http://bit.ly/1F72HkH Click here for more interviews on immortality http://bit.ly/1OQiz1w Click here to buy episodes of Closer To Truth http://bit.ly/1LUPlQS For all of our video interviews please visit us at www.closertotruth.com
From playlist Closer To Truth - Gregory Boyd Interviews
Dmitry Kaledin - 2/3 Motives from the Non-commutative Point of View
Motives were initially conceived as a way to unify various cohomology theories that appear in algebraic geometry, and these can be roughly divided into two groups: theories of etale type, and theories of cristalline/de Rham type. The obvious unifying feature of all the theories is that the
From playlist Summer School 2020: Motivic, Equivariant and Non-commutative Homotopy Theory