In mathematics, Hermite numbers are values of Hermite polynomials at zero argument. Typically they are defined for physicists' Hermite polynomials. (Wikipedia).
Series solution of the Hermite differential equation. Shows how to construct the Hermite polynomials. Join me on Coursera: Differential equations for engineers https://www.coursera.org/learn/differential-equations-engineers Matrix algebra for engineers https://www.coursera.org/learn/matr
From playlist Differential Equations with YouTube Examples
Physics - Ch 66 Ch 4 Quantum Mechanics: Schrodinger Eqn (56 of 92) What is a Hermite Polynomial?
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain what is a Hermite polynomial. Previous videos showed the solution best describe the quantum oscillator of the Schrodinger equation is the product of a constant that needed to be normalized, mu
From playlist THE "WHAT IS" PLAYLIST
Physics - Ch 66 Ch 4 Quantum Mechanics: Schrodinger Eqn (57 of 92) Calculating Hermite Polynomial?
Visit http://ilectureonline.com for more math and science lectures! In this video I will calculate the first few Hermitian polynomials stating with n=0 to n=3. Next video in this series can be seen at: https://youtu.be/9euxAKJDll0
From playlist PHYSICS 66.1 QUANTUM MECHANICS - SCHRODINGER EQUATION
Math 060 Fall 2017 112717C Hermitian Matrices Part 1
Definitions: complex conjugate, modulus, complex vector, conjugate transpose, complex inner product, conjugate matrix. Hermitian matrices. Hermitian matrices and the inner product. Hermitian matrices have 1. real eigenvalues, 2. orthogonal eigenspaces. Unitary matrices. Hermitian matr
From playlist Course 4: Linear Algebra (Fall 2017)
Hermitian Operators (Self-Adjoint Operators) |Â Quantum Mechanics
In this video, we will talk about Hermitian operators in quantum mechanics. If an operator A is a Hermitian operator, then it is the same as its adjoint operator A-dagger, which is defined via this equation here. Usually, the terms "Hermitian" and "self adjoint" are used interchangeably, h
From playlist Quantum Mechanics, Quantum Field Theory
Hermite interpolation. Numerical methods, chapter 2, additional video no 3. To be viewed after video Ch02n2. Wen Shen, Penn State University, 2018.
From playlist CMPSC/MATH 451 Videos. Wen Shen, Penn State University
Integral row reduction + Hermite normal form|Abstract Algebra Math Foundations 223 | NJ Wildberger
We have a careful look at getting a good basis of an integral linear space through a specific algorithm which is essentially that of Hermite normal form. Usually in linear algebra courses this is framed in terms of matrices, but here we are taking more of an mset point of view, but the ide
From playlist Math Foundations
Solve Multi-Step Equations Worksheet | 16 Examples
Timestamps: 0:00 Intro 0:46 Example #1 1:37 Example #2 2:53 Example #3 3:33 Example #4 4:05 Example #5 5:06 Example #6 5:49 Example #7 6:46 Example #8 8:16 Example #9 9:06 Example #10 10:02 Example #11 10:36 Example #12 10:56 Example #13 11:46 Example #14 12:17 Example #15 12:56 E
From playlist Solve Linear Equations Worksheets
Advice for Amateur Mathematicians | The joy of maxel number theory and Hermite polyns |Wild Egg Math
We extend our two dimensional number theory point of view to the case of Hermite polynomials. These actually come in two different kinds: called the probabilists' and the physicists' versions. Can we find some interesting patterns when we express these in a two-dimensional setting as a tr
From playlist Maxel inverses and orthogonal polynomials (non-Members)
Major mistake when solving rational equations
👉Here is one of the major mistakes I see when students are solving rational equations. Timestamps: 0:00 Intro 0:26 Example #1 1:08 Example #2 2:12 Example #3 3:37 Example #4 4:08 Example #5 5:00 Example #6 6:41 Example #7 7:54 Example #8 8:44 Example #9 Corrections: 4:02 In Example
From playlist Rational Functions and Polynomials in Pre-Calculus
Phong NGUYEN - Recent progress on lattices's computations 2
This is an introduction to the mysterious world of lattice algorithms, which have found many applications in computer science, notably in cryptography. We will explain how lattices are represented by computers. We will present the main hard computational problems on lattices: SVP, CVP and
From playlist École d'Été 2022 - Cohomology Geometry and Explicit Number Theory
Spin Glass Phase at Zero Temperature in the Edwards--Anderson Model by Sourav Chatterjee
PROGRAM: TOPICS IN HIGH DIMENSIONAL PROBABILITY ORGANIZERS: Anirban Basak (ICTS-TIFR, India) and Riddhipratim Basu (ICTS-TIFR, India) DATE & TIME: 02 January 2023 to 13 January 2023 VENUE: Ramanujan Lecture Hall This program will focus on several interconnected themes in modern probab
From playlist TOPICS IN HIGH DIMENSIONAL PROBABILITY
Ch04n2: Integrals over Infinite Intervals, Gauss Laguerre, Gauss Hermite
Integrals over Infinite Intervals. Gauss Laguerre, Gauss Hermite Numerical Computation, chapter 4, additional video no 2. To be viewed after the video ch04n1. Wen Shen, Penn State University, 2018.
From playlist CMPSC/MATH 451 Videos. Wen Shen, Penn State University
Physics - Ch 66 Ch 4 Quantum Mechanics: Schrodinger Eqn (55 of 92) Solution of the Oscillator
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain the solution to the Schrodinger equation to the quantum mechanic oscillator. Assuming the potential energy (a function of the square of the amplitude, A^2) is greater or equal to 1, the soluti
From playlist PHYSICS 66.1 QUANTUM MECHANICS - SCHRODINGER EQUATION
10c Machine Learning: Polynomial Regression
Lecture on polynomial regression, including an intuitive alternative interpretation, basis expansion concepts and orthogonal basis through Hermite polynomials. Follow along with the demonstration workflow: https://github.com/GeostatsGuy/PythonNumericalDemos/blob/master/SubsurfaceDataAnaly
From playlist Machine Learning
A central limit theorem for Gaussian polynomials... pt1 -Anindya De
Anindya De Institute for Advanced Study; Member, School of Mathematics May 13, 2014 A central limit theorem for Gaussian polynomials and deterministic approximate counting for polynomial threshold functions In this talk, we will continue, the proof of the Central Limit theorem from my las
From playlist Mathematics
Math 060 Linear Algebra 29 112114: Hermitian Matrices are Unitarily Diagonalizable
Complex numbers; complex conjugation; complex inner product; complex matrices; Hermitian matrices; Hermitian matrices have real eigenvalues and orthogonal eigenspaces (and thus are unitarily diagonalizable).
From playlist Course 4: Linear Algebra
Shmoocon 2010: Becoming Jack Flack: Real Life Cloak & Dagger 1/6
Clip 1/6 Speakers: Taylor Banks and Adam Bregenzer Are you on too many social networking sites? Have all of your exes found you on facebook? If the fuzz came looking, how easy it would be for them to find you? kaos.theory, the creators of Anonym.OS, bring you this abridged guide to bec
From playlist ShmooCon 2010