What is Einstein's cosmological constant?
Einstein's cosmological constant resulted from a prejudice regarding how the universe should behave. Brian Greene explains why the great physicist edited his equations to include it. Subscribe to our YouTube Channel for all the latest from World Science U. Visit our Website: http://www.w
From playlist Science Unplugged: General Relativity
The Constant of Integration is ALWAYS Zero
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys The Constant of Integration is ALWAYS Zero
From playlist Math Magic
What does it mean for the speed of light to be constant?
Hi Everyone, Here's a short clip from a new informal video series I'm doing each week with Albert Einstein -- well, ok, his Facebook page. We'll cover a range of topics at a variety of levels. This video is a basic discussion of what it means for the speed of light to be constant.
From playlist A Moment of Science with Brian Greene
Your Daily Equation #26: Einstein's General Theory of Relativity: The Essential Idea
Episode 26 #YourDailyEquation: Albert Einstein's General Theory of Relativity, phrased in terms of warps and curves in space and time, provides our most refined description of the gravitational force. Join Brian Greene for a visual exploration of Einstein's most profound discovery and the
From playlist Your Daily Equation with Brian Greene
In this video, I show a really neat result, namely that the maximum of two continuous functions is continuous. Enjoy the epsilon-delta extravaganza! Continuity Playlist: https://www.youtube.com/playlist?list=PLJb1qAQIrmmB86yhDeAUZPY0dktFtb8Tj Subscribe to my channel: https://youtube.com/d
From playlist Limits and Continuity
Watch more videos on http://www.brightstorm.com/science/physics SUBSCRIBE FOR All OUR VIDEOS! https://www.youtube.com/subscription_center?add_user=brightstorm2 VISIT BRIGHTSTORM.com FOR TONS OF VIDEO TUTORIALS AND OTHER FEATURES! http://www.brightstorm.com/ LET'S CONNECT! Facebook ► ht
From playlist Physics
Continuity and Monotonicity In this video, I show a very interesting fact about functions: Namely, if a function f is continuous and one-to-one, then it is either strictly increasing, or strictly decreasing. Intuitively it makes sense, but can you prove it? Continuity Playlist: https://w
From playlist Limits and Continuity
Your Daily Equation #12: The Schrödinger Equation--the Core of Quantum Mechanics
Episode 12 #YourDailyEquation: At the core of Quantum Mechanics -- the most precise theory ever developed -- is Schrödinger's Equation. In this episode of Your Daily Equation, Brian Greene explains where the equation comes from and how it is used. Even if your math is a bit rusty, join B
From playlist Your Daily Equation with Brian Greene
The Bernstein Sato polynomial: Introduction
This is the first of three talks about the Bernstein-Sato polynomial. The second talk should appear at https://youtu.be/FAKzbvDm-w0 on Dec 22 5:00am PST We define the Bernstein-Sato polynomial of a polynomial in several complex variables, and show how it can be used to analytically con
From playlist Commutative algebra
Mod-01 Lec-02 Polynomial Approximation
Elementary Numerical Analysis by Prof. Rekha P. Kulkarni,Department of Mathematics,IIT Bombay.For more details on NPTEL visit http://nptel.ac.in
From playlist NPTEL: Elementary Numerical Analysis | CosmoLearning Mathematics
The Bernstein Sato polynomial: Holonomic modules
This is the third of three talks about the Bernstein-Sato polynomial. The first talk is at https://youtu.be/CX2iej9NKzs We use Bernstein's inequality from the second talk to show that holonomic modules have finite length. We then use this to prove that a particular module is holonomic, wh
From playlist Commutative algebra
Shimura Varieties and the Bernstein Center - Tom Haines
Shimura Varieties and the Bernstein Center - Tom Haines University of Maryland; von Neumann Fellow, School of Mathematics December 6, 2010 The local Langlands conjecture (LLC) seeks to parametrize irreducible smooth representations of a p-adic group G in terms of Weil-Deligne parameters. B
From playlist Mathematics
Jeff Calder: "An intro to concentration of measure with applications to graph-based l... (Part 2/2)"
Watch part 1/2 here: https://youtu.be/Q5fB5Ldzo-g High Dimensional Hamilton-Jacobi PDEs Tutorials 2020 "An introduction to concentration of measure with applications to graph-based learning (Part 2/2)" Jeff Calder, University of Minnesota - Twin Cities Abstract: We will give a gentle in
From playlist High Dimensional Hamilton-Jacobi PDEs 2020
"When" Is the graph increasing decreasing constant?
👉 Learn how to determine increasing/decreasing intervals. There are many ways in which we can determine whether a function is increasing or decreasing but we will focus on determining increasing/decreasing from the graph of the function. A function is increasing when the graph of the funct
From playlist When is the Function Increasing Decreasing or Neither
MAST30026 Lecture 16: Stone-Weierstrass theorem (Part 1)
The Weierstrass approximation theorem says that an arbitrary continuous function on a finite closed interval can be approximated uniformly by polynomials to any desired degree of accuracy. I proved this theorem using Bernstein polynomials. Lecture notes: http://therisingsea.org/notes/mas
From playlist MAST30026 Metric and Hilbert spaces
Nigel Higson: Isomorphism conjectures for non discrete groups
The lecture was held within the framework of the (Junior) Hausdorff Trimester Program Topology: "The Farrell-Jones conjecture" I shall discuss aspects of the C*-algebraic version of the Farrell-Jones conjecture (namely the Baum-Connes conjecture) for Lie groups and p-adic groups. The conj
From playlist HIM Lectures: Junior Trimester Program "Topology"
Alexander Pushnitski : Rational approximation of functions with logarithmic singularities
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities: - Chapter markers and keywords to watch the parts of your choice in the video - Videos enriched with abstracts, b
From playlist Analysis and its Applications
Bertrand Lemaire - Transfert géométrique et blocs de Bernstein...
Transfert géométrique et blocs de Bernstein des séries principales de niveau zéro (avec Manish Mishra) On s'intéresse ici à une situation endoscopique très particulière, issue du travail de Roche sur les séries principales de niveau zéro d'un groupe réductif connexe déployé
From playlist Reductive groups and automorphic forms. Dedicated to the French school of automorphic forms and in memory of Roger Godement.
Nigel Higson: Parabolic induction
The lecture was held within the framework of Follow-up Workshop TP Rigidity. 30.4.2015
From playlist HIM Lectures 2015
Intervals of increasing and decreasing function from a graph
👉 Learn how to determine increasing/decreasing intervals. There are many ways in which we can determine whether a function is increasing or decreasing but we will focus on determining increasing/decreasing from the graph of the function. A function is increasing when the graph of the funct
From playlist When is the Function Increasing Decreasing or Neither