This video explains how to multiply using whole numbers. http://mathispower4u.yolasite.com/
From playlist Multiplying and Dividing Whole Numbers
In this video we construct a symmetric group from the set that contains the six permutations of a 3 element group under composition of mappings as our binary operation. The specifics topics in this video include: permutations, sets, groups, injective, surjective, bijective mappings, onto
From playlist Abstract algebra
You might find that for certain groups, the commutative property hold. In this video we will assume the existence of such a group and prove a few properties that it may have, by way of some example problems.
From playlist Abstract algebra
The General Linear Group, The Special Linear Group, The Group C^n with Componentwise Multiplication
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys The General Linear Group, The Special Linear Group, The Group C^n with Componentwise Multiplication
From playlist Abstract Algebra
Permutation Groups and Symmetric Groups | Abstract Algebra
We introduce permutation groups and symmetric groups. We cover some permutation notation, composition of permutations, composition of functions in general, and prove that the permutations of a set make a group (with certain details omitted). #abstractalgebra #grouptheory We will see the
From playlist Abstract Algebra
Definition of the Symmetric Group
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys Definition of the Symmetric Group
From playlist Abstract Algebra
Definition of a Subgroup in Abstract Algebra with Examples of Subgroups
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys Definition of a Subgroup in Abstract Algebra with Examples of Subgroups
From playlist Abstract Algebra
Example of Group: GL(2, R) (3 of 3)
Abstract Algebra: Let G=GL(2, R) be the group of real invertible 2x2 matrices. We consider two group actions for the group GL(2, R) on itself. We interpret the results in terms of linear algebra and change of basis. We also explain how conjugacy classes of G relate to the diagonalizati
From playlist Abstract Algebra
Lecture 8B : Modeling character strings with multiplicative connections
Neural Networks for Machine Learning by Geoffrey Hinton [Coursera 2013] Lecture 8B : Modeling character strings with multiplicative connections
From playlist Neural Networks for Machine Learning by Professor Geoffrey Hinton [Complete]
Lecture 8.2 — Modeling character strings [Neural Networks for Machine Learning]
Lecture from the course Neural Networks for Machine Learning, as taught by Geoffrey Hinton (University of Toronto) on Coursera in 2012. Link to the course (login required): https://class.coursera.org/neuralnets-2012-001
From playlist [Coursera] Neural Networks for Machine Learning — Geoffrey Hinton
Hypergroup definition and five key examples | Diffusion Symmetry 4 | N J Wildberger
We state a precise definition of a finite commutative hypergroup, and then give five important classes of examples, 1) the class hypergroup of a finite (non-commutative) group G 2) the character hypergroup of a finite (non-commutative) group G 3) the hypergroup associated to a distance-tr
From playlist Diffusion Symmetry: A bridge between mathematics and physics
Giovanni Peccati: Some applications of variational techniques in stochastic geometry II
Some variance estimates on the Poisson space, Part II I will introduce the notion of second-order Poincaré inequalities on the Poisson space and describe their use in a geometric context - with specific emphasis on quantitative CLTs for strongly stabilizing functionals, and on fourth-mome
From playlist Winter School on the Interplay between High-Dimensional Geometry and Probability
Studying thermal QCD matter on the lattice (LQCD1 - Lecture 3) by Peter Petreczky
PROGRAM THE MYRIAD COLORFUL WAYS OF UNDERSTANDING EXTREME QCD MATTER ORGANIZERS: Ayan Mukhopadhyay, Sayantan Sharma and Ravindran V DATE: 01 April 2019 to 17 April 2019 VENUE: Ramanujan Lecture Hall, ICTS Bangalore Strongly interacting phases of QCD matter at extreme temperature and
From playlist The Myriad Colorful Ways of Understanding Extreme QCD Matter 2019
Twisted Cocycles = (Vector Bundles + Sections of Vector Bundles)
A Trick: If J is a torsor under a vector bundle T then it turns out that the class of J in H^1(X,T) actually correspond to a class in H^1(X, GG^r_a \rtimes GL_r). This is part 1 of 2 of some videos that explain this. Here we just show how to convert cocycle. The second part we introduce th
From playlist Fiber bundles
How to Multiply Cycles in the Symmetric Group S_5
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys How to Multiply Cycles in the Symmetric Group S_5. A simple example with two 5-cycles. The multiplication is performed right to left.
From playlist Abstract Algebra
The Poisson boundary: a qualitative theory (Lecture 2) by Vadim Kaimanovich
Program Probabilistic Methods in Negative Curvature ORGANIZERS: Riddhipratim Basu, Anish Ghosh and Mahan Mj DATE: 11 March 2019 to 22 March 2019 VENUE: Madhava Lecture Hall, ICTS, Bangalore The focal area of the program lies at the juncture of three areas: Probability theory o
From playlist Probabilistic Methods in Negative Curvature - 2019
What is a Manifold? Lesson 13: The tangent bundle - an illustration.
What is a Manifold? Lesson 13: The tangent bundle - an illustration. Here we have a close look at a complete example using the tangent bundle of the manifold S_1. Next lesson we look at the Mobius strip as a fiber bundle.
From playlist What is a Manifold?
Abstract Algebra 1.5 : Examples of Groups
In this video, I introduce many important examples of groups. This includes the group of (rigid) motions, orthogonal group, special orthogonal group, the dihedral groups, and the "finite cyclic group" Z/nZ (or Z_n). Email : fematikaqna@gmail.com Code : https://github.com/Fematika/Animatio
From playlist Abstract Algebra
A Group Theoretic Description | The Geometry of SL(2,Z), Section 2.1
Expressing the complex upper half plane as a quotient of topological (in fact, Lie) groups. Twitter: https://twitter.com/KristapsBalodi3 Topological Groups (0:00) A Lemma on Stabilization (7:19) Connecting Geometry and Algebra (9:55)
From playlist The Geometry of SL(2,Z)