Mathematical constants | Articles containing proofs | Real transcendental numbers
The omega constant is a mathematical constant defined as the unique real number that satisfies the equation It is the value of W(1), where W is Lambert's W function. The name is derived from the alternate name for Lambert's W function, the omega function. The numerical value of Ω is given by Ω = 0.567143290409783872999968662210... (sequence in the OEIS).1/Ω = 1.763222834351896710225201776951... (sequence in the OEIS). (Wikipedia).
Ex: Limit Definition - Find Delta Values, Given Epsilon For a Limit
This video explains how to determine which delta values satisfy a given epsilon of a limit. http://mathispower4u.com
From playlist Limits
What is the official definition of limit? - Week 2 - Lecture 12 - Mooculus
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From playlist Ohio State: Jim Fowler's Calculus One Lectures | CosmoLearning Mathematics
Teach Astronomy - Density Parameter
http://www.teachastronomy.com/ Another fundamental quantity of the big bang model is the density parameter. It's defined as the ratio of the mean density of the universe to the density just needed to overcome the cosmic expansion. The density parameter is denoted by the Greek symbol capi
From playlist 22. The Big Bang, Inflation, and General Cosmology
Epsilon delta limit (Example 3): Infinite limit at a point
This is the continuation of the epsilon-delta series! You can find Examples 1 and 2 on blackpenredpen's channel. Here I use an epsilon-delta argument to calculate an infinite limit, and at the same time I'm showing you how to calculate a right-hand-side limit. Enjoy!
From playlist Calculus
Introduction to Big-Omega Notation
This video introduces Big-Omega notation. http://mathispower4u.com
From playlist Additional Topics: Generating Functions and Intro to Number Theory (Discrete Math)
Ex 1: Limit Definition - Determine Delta for an Arbitrary Epsilon (Linear)
This video explains how to determine an expression of delta for an arbitrary epsilon that can be used to prove a limit exists. http://mathispower4u.com
From playlist Limits
Ex 2: Limit Definition - Determine Delta for an Arbitrary Epsilon (Quadratic)
This video explains how to determine an expression of delta for an arbitrary epsilon that can be used to prove a limit exists. http://mathispower4u.com
From playlist Limits
Planck's Constant - Sixty Symbols
This is one of the most important numbers in physics and is "unimaginably small" - or does it just seems small? More symbols explained at http://www.sixtysymbols.com/
From playlist From Sixty Symbols
Calculus - Find the limit of a function using epsilon and delta
This video shows how to use epsilon and delta to prove that the limit of a function is a certain value. This particular video uses a linear function to highlight the process and make it easier to understand. Later videos take care of more complicated functions and using epsilon and delta
From playlist Calculus
Monge-Ampere equations on complex manifolds - Ben Weinkove [2015]
Name: Ben Weinkove Event: Workshop 2012-2013ay - Graduate Workshop on Kahler Geometry Event URL: view webpage Title: Monge-Ampere equations on complex manifolds- 1 hr Date: 2013-06-24 @4:00 PM Location: 102 http://scgp.stonybrook.edu/video_portal/video.php?id=748
From playlist Mathematics
Metrics of constant Chern scalar curvature and a Chern-Calabi flow
Speaker: Sisi Shen (Northwestern) Abstract: We discuss the existence problem of constant Chern scalar curvature metrics on a compact complex manifold. We prove a priori estimates for these metrics conditional on an upper bound on the entropy, extending a recent result by Chen-Cheng in the
From playlist Informal Geometric Analysis Seminar
Metrics of constant Chern scalar curvature - Xi Sisi Shen
Seminar in Analysis and Geometry Topic: Metrics of constant Chern scalar curvature Speaker: Xi Sisi Shen Affiliation: Columbia University Date: May 03, 2022 We discuss the existence problem of constant Chern scalar curvature metrics on a compact complex manifold. We prove a priori estima
From playlist Mathematics
Isoperimetry and boundaries with almost constant mean curvature - Francesco Maggi
Variational Methods in Geometry Seminar Topic: Isoperimetry and boundaries with almost constant mean curvature Speaker: Francesco Maggi Affiliation: The University of Texas at Austin; Member, School of Mathematics Date: February 12, 2019 For more video please visit http://video.ias.edu
From playlist Variational Methods in Geometry
Optimal shape and location of sensors or actuators in PDE models – Emmanuel Trélat – ICM2018
Control Theory and Optimization Invited Lecture 16.1 Optimal shape and location of sensors or actuators in PDE models Emmanuel Trélat Abstract: We report on a series of works done in collaboration with Y. Privat and E. Zuazua, concerning the problem of optimizing the shape and location o
From playlist Control Theory and Optimization
J.-M. Martell - A minicourse on Harmonic measure and Rectifiability (Part 3)
Solving the Dirichlet boundary value problem for an elliptic operator amounts to study the good properties of the associated elliptic measure. In the context of domains having an Ahlfors regular boundary and satisfying theso-called interior corkscrew and Harnack chain conditions (these ar
From playlist Rencontres du GDR AFHP 2019
J.-M. Martell - A minicourse on Harmonic measure and Rectifiability (Part 2)
Solving the Dirichlet boundary value problem for an elliptic operator amounts to study the good properties of the associated elliptic measure. In the context of domains having an Ahlfors regular boundary and satisfying theso-called interior corkscrew and Harnack chain conditions (these ar
From playlist Rencontres du GDR AFHP 2019
Electrical Engineering: Ch 16: Laplace Transform (56 of 58) Undamped System with a Spring
Visit http://ilectureonline.com for more math and science lectures! In this video I will find y(t)=? of an undamped system with a spring with mass. Next video in this series can be seen at: https://youtu.be/VvDQtArBKo8
From playlist ELECTRICAL ENGINEERING 16: THE LAPLACE TRANSFORM
PHYS 146 Oscillations Part 1: Derivation of Simple Harmonic Motion
Video lecture for PHYS 146 at the University of Alberta. For the iBook on the course go to: https://itunes.apple.com/us/book/fluids-and-waves/id1056957688?ls=1&mt=13 This video introduces the parameters used to describe an oscillator and, using the case of a mass-spring systems, derives t
From playlist UAlberta: PHYS 146 - Fluids and Waves with Roger Moore | CosmoLearning.org Physics
From playlist Algorithms 1
Liangbing Luo (U Conn) -- Logarithmic Sobolev Inequalities on Non-isotropic Heisenberg Groups
A Heisenberg group is the simplest non-trivial example of a sub-Riemannian manifold. In this talk, we will discuss the dimension (in)dependence of the constants in logarithmic Sobolev inequalities on non-isotropic Heisenberg groups. In this setting, a natural Laplacian is not an elliptic b
From playlist Northeastern Probability Seminar 2020