Trees (topology) | Continuum theory
In mathematics, a dendrite is a certain type of topological space that may be characterized either as a locally connected dendroid or equivalently as a locally connected continuum that contains no simple closed curves. (Wikipedia).
Ring Theory: We define rings and give many examples. Items under consideration include commutativity and multiplicative inverses. Example include modular integers, square matrices, polynomial rings, quaternions, and adjoins of algebraic and transcendental numbers.
From playlist Abstract Algebra
The Field With One Element and The Riemann Hypothesis (Full Video)
A crash course of Deninger's program to prove the Riemann Hypothesis using a cohomological interpretation of the Riemann Zeta Function. You can Deninger talk about this in more detail here: http://swc.math.arizona.edu/dls/ Leave some comments!
From playlist Riemann Hypothesis
Number theory Full Course [A to Z]
Number theory (or arithmetic or higher arithmetic in older usage) is a branch of pure #mathematics devoted primarily to the study of the integers and integer-valued functions. Number theorists study prime numbers as well as the properties of objects made out of integers (for example, ratio
From playlist Number Theory
Logic: The Structure of Reason
As a tool for characterizing rational thought, logic cuts across many philosophical disciplines and lies at the core of mathematics and computer science. Drawing on Aristotle’s Organon, Russell’s Principia Mathematica, and other central works, this program tracks the evolution of logic, be
From playlist Logic & Philosophy of Mathematics
Calculus 1.1d - The word `Calculus`
A brief discuss of the word "Calculus" and its meaning and use
From playlist Calculus Chapter 1
Rationalising The Denominator | Algebra | Maths | FuseSchool
In this video we discover what rationalising the denominator is and how to do it. The denominator is the bottom part of a fraction. Rationalising the denominator is when we move a root from the bottom - the denominator - to the top (the numerator). For a surd to be in it’s simplest form, t
From playlist MATHS
2.1 Function, Domain, and Range
MATH 1314 Kilgore College
From playlist MATH 1314: College Algebra (depreciated)
Intro to Number Theory and The Divisibility Relation
This video introduces the divisibility relation and provided several examples. mathispower4u.com
From playlist Additional Topics: Generating Functions and Intro to Number Theory (Discrete Math)
http://www.teachastronomy.com/ Logic is a fundamental tool of the scientific method. In logic we can combine statements that are made in words or in mathematical symbols to produce concrete and predictable results. Logic is one of the ways that science moves forward. The first ideas of
From playlist 01. Fundamentals of Science and Astronomy
6: Dendrites - Intro to Neural Computation
MIT 9.40 Introduction to Neural Computation, Spring 2018 Instructor: Michale Fee View the complete course: https://ocw.mit.edu/9-40S18 YouTube Playlist: https://www.youtube.com/playlist?list=PLUl4u3cNGP61I4aI5T6OaFfRK2gihjiMm Covers the dendrite circuit diagram, voltage plot, length diagr
From playlist MIT 9.40 Introduction to Neural Computation, Spring 2018
8ECM Public Lecture: Kathryn Hess
From playlist 8ECM Public Lectures
Lida Kanari and Kathryn Hess - Topological insights in Neuroscience
---------------------------------- Institut Henri Poincaré, 11 rue Pierre et Marie Curie, 75005 PARIS http://www.ihp.fr/ Rejoingez les réseaux sociaux de l'IHP pour être au courant de nos actualités : - Facebook : https://www.facebook.com/InstitutHenriPoincare/ - Twitter : https://twitter
From playlist Workshop "Workshop on Mathematical Modeling and Statistical Analysis in Neuroscience" - January 31st - February 4th, 2022
Architects of the Mind: A Blueprint for the Human Brain
Is the human brain an elaborate organic computer? Since the time of the earliest electronic computers, some have imagined that with sufficiently robust memory, processing speed, and programming, a functioning human brain can be replicated in silicon. Others disagree, arguing that central t
From playlist World Science Festival 2013
A mathematical adventure in immunology by Carmen Molina-Paris
KAAPI WITH KURIOSITY A MATHEMATICAL ADVENTURE IN IMMUNOLOGY SPEAKER: Carmen Molina-Paris (School of Mathematics, University of Leeds, UK) WHEN: 4pm to 5pm Sunday, 07 July 2019 WHERE:J. N. Planetarium, Sri T. Chowdaiah Road, High Grounds, Bangalore Our immune system is an extraordinary
From playlist Kaapi With Kuriosity (A Monthly Public Lecture Series)
8: Spike Trains - Intro to Neural Computation
MIT 9.40 Introduction to Neural Computation, Spring 2018 Instructor: Michale Fee View the complete course: https://ocw.mit.edu/9-40S18 YouTube Playlist: https://www.youtube.com/playlist?list=PLUl4u3cNGP61I4aI5T6OaFfRK2gihjiMm Covers extracellular spike waveforms, local field potentials, s
From playlist MIT 9.40 Introduction to Neural Computation, Spring 2018
Neural Network Architectures | Types of Neural Network Architectures | Neural Network | Simplilearn
This video by simplilearn is based on artificial neural network architecture. This artificial intelligence and machine learning tutorial will help you understand neural network architectures in detail and types of neural network architectures. this neural network tutorial will include both
From playlist Machine Learning Algorithms [2022 Updated]
7: Synapses - Intro to Neural Computation
MIT 9.40 Introduction to Neural Computation, Spring 2018 Instructor: Michale Fee View the complete course: https://ocw.mit.edu/9-40S18 YouTube Playlist: https://www.youtube.com/playlist?list=PLUl4u3cNGP61I4aI5T6OaFfRK2gihjiMm This lecture covers models of synaptic transmission, spike trai
From playlist MIT 9.40 Introduction to Neural Computation, Spring 2018
The realm of natural numbers | Data structures in Mathematics Math Foundations 155
Here we look at a somewhat unfamiliar aspect of arithmetic with natural numbers, motivated by operations with multisets, and ultimately forming a main ingredient for that theory. We look at natural numbers, together with 0, under three operations: addition, union and intersection. We will
From playlist Math Foundations