Theorems in abstract algebra | Field (mathematics)
In mathematics, Strassmann's theorem is a result in field theory. It states that, for suitable fields, suitable formal power series with coefficients in the valuation ring of the field have only finitely many zeroes. (Wikipedia).
The Schrodinger Equation is (Almost) Impossible to Solve.
Sure, the equation is easily solvable for perfect / idealized systems, but almost impossible for any real systems. The Schrodinger equation is the governing equation of quantum mechanics, and determines the relationship between a system, its surroundings, and a system's wave function. Th
From playlist Quantum Physics by Parth G
Dealing with Schrodinger's Equation - The Hamiltonian
https://www.patreon.com/edmundsj If you want to see more of these videos, or would like to say thanks for this one, the best way you can do that is by becoming a patron - see the link above :). And a huge thank you to all my existing patrons - you make these videos possible. Schrodinger's
From playlist Quantum Mechanics
What Really Happened the First Time We Split a Heavy Atom in Half
This episode was produced in collaboration with and sponsored by Emerson. Click here to learn more about their We Love STEM initiative: http://bit.ly/2fnBiHO When scientists first split the atom, they didn’t realize what they’d done until physicist Lise Meitner figured out they had discov
From playlist Uploads
Jocelyne Bion Nadal: Approximation and calibration of laws of solutions to stochastic...
Abstract: In many situations where stochastic modeling is used, one desires to choose the coefficients of a stochastic differential equation which represents the reality as simply as possible. For example one desires to approximate a diffusion model with high complexity coefficients by a m
From playlist Probability and Statistics
Marc Hindry: Brauer-Siegel theorem and analogues for varieties over global fields
Abstract: The classical Brauer-Siegel theorem can be seen as one of the first instances of description of asymptotical arithmetic: it states that, for a family of number fields Ki, under mild conditions (e.g. bounded degree), the product of the regulator by the class number behaves asympt
From playlist Algebraic and Complex Geometry
Separation of variables and the Schrodinger equation
A brief explanation of separation of variables, application to the time-dependent Schrodinger equation, and the solution to the time part. (This lecture is part of a series for a course based on Griffiths' Introduction to Quantum Mechanics. The Full playlist is at http://www.youtube.com/
From playlist Mathematical Physics II - Youtube
Joan Strassmann: The Woman Who Stared at Wasps
Joan Strassmann explains the benefits of studying social amoebas. QUANTA MAGAZINE Website: https://www.quantamagazine.org/ Facebook: https://www.facebook.com/QuantaNews Twitter: https://twitter.com/QuantaMagazine You can also sign up for our weekly newsletter: http://eepurl.com/6FnWj.
From playlist Inside the Mind of a Scientist
Schrodinger's Equation for wave functions in Quantum Physics. My Patreon Page is at https://www.patreon.com/EugeneK
From playlist Physics
Calculus 5.3 The Fundamental Theorem of Calculus
My notes are available at http://asherbroberts.com/ (so you can write along with me). Calculus: Early Transcendentals 8th Edition by James Stewart
From playlist Calculus
[ANT14] Eisenstein polynomials and Strassmann's theorem, via a cubic example
So far we've focused mostly on quadratic extensions, and have missed some interesting (although rather tricky and technical!) results as a consequence. Let's see a few of them.
From playlist [ANT] An unorthodox introduction to algebraic number theory
Jean Pierre Serre: Distributions des valeurs propres des Frobenius des variétés abéliennes ...
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 Jean-Morlet Chair - Shparlinski/Kohel
Lise Where's-My-Nobel-Prize Meitner
A video about Lise Where's-My-Nobel-Prize Meitner, in which a brilliant physicist helps split the atoms and does not receive a nobel prize.
From playlist Women of Science and Math
Differential Equations | Application of Abel's Theorem Example 2
We give an example of applying Abel's Theorem to construct a second solution to a differential equation given one solution. www.michael-penn.net
From playlist Differential Equations
What Is Six Sigma | Six Sigma Green Belt Training | Simplilearn
Six Sigma (6σ) is a set of techniques and tools for process improvement. It seeks to improve the quality of the output of a process by identifying and removing the causes of defects and minimizing variability in manufacturing and business processes. It uses a set of quality management meth
From playlist Six Sigma Training Videos [2022 Updated]
Physical Science 7.5a - Nuclear Fission - Part 1
The fission of Uranium 235. The discovery of nuclear fission, and a description of what is happening in the nucleus when the atom splits.
From playlist Physical Science - Atoms
Differential Equations | Abel's Theorem
We present Abel's Theorem with a proof. http://www.michael-penn.net
From playlist Differential Equations
Nuclear Fission and Fusion (warning contains graphic content)
IGCSE Edexcel Physics Lesson on nuclear fission and fusion
From playlist Edexecel IGCSE Physics
Physical Science 7.5c - The Manhattan Project
The Manhattan Project. The secret project to develop the world's first atomic bomb. From the Physical Science class by Derek Owens
From playlist Physical Science - Atoms
Hunting Heisenberg: Capturing Germany's Atomic Secrets
The Alsos Mission, a joint US-UK secret team of nuclear experts was sent in 1945 to track down top German physicist Werner Heisenberg and the scientists and technology creating Germany's atomic weapons programme. It was a race against time, as the Allies were worried that the German's migh
From playlist The Cold War 1945-91
D. Oliveira e Silva: Some Sharp Strichartz Inequalities
Abstract: It has long been understood that Strichartz estimates for the homogeneous Schrödinger equation correspond to adjoint Fourier restriction estimates on the paraboloid. The study of extremizers and sharp constants for the corresponding inequalities has a short but rich history. In t
From playlist Follow-up Workshop to TP "Harmonic Analysis and Partial Differential Equations"