In graph drawing, a universal point set of order n is a set S of points in the Euclidean plane with the property that every n-vertex planar graph has a straight-line drawing in which the vertices are all placed at points of S. (Wikipedia).
Set Theory (Part 2b): The Bogus Universal Set
Please feel free to leave comments/questions on the video below! In this video, I argue against the existence of the set of all sets and show that this claim is provable in ZFC. This theorem is very much tied to the Russell Paradox, besides being one of the problematic ideas in mathematic
From playlist Set Theory by Mathoma
What is the complement of a set? Sets in mathematics are very cool, and one of my favorite thins in set theory is the complement and the universal set. In this video we will define complement in set theory, and in order to do so you will also need to know the meaning of universal set. I go
From playlist Set Theory
Listing elements from a set (2)
Powered by https://www.numerise.com/ Listing elements from a set (2)
From playlist Set theory
The circle and Cartesian coordinates | Universal Hyperbolic Geometry 5 | NJ Wildberger
This video introduces basic facts about points, lines and the unit circle in terms of Cartesian coordinates. A point is an ordered pair of (rational) numbers, a line is a proportion (a:b:c) representing the equation ax+by=c, and the unit circle is x^2+y^2=1. With this notation we determine
From playlist Universal Hyperbolic Geometry
👉 Learn essential definitions of points, lines, and planes. A point defines a position in space. A line is a set of points. A line can be created by a minimum of two points. A plane is a flat surface made up of at least three points. A plane contains infinite number of lines. A ray is a li
From playlist Points Lines and Planes
👉 Learn essential definitions of points, lines, and planes. A point defines a position in space. A line is a set of points. A line can be created by a minimum of two points. A plane is a flat surface made up of at least three points. A plane contains infinite number of lines. A ray is a li
From playlist Points Lines and Planes
👉 Learn essential definitions of points, lines, and planes. A point defines a position in space. A line is a set of points. A line can be created by a minimum of two points. A plane is a flat surface made up of at least three points. A plane contains infinite number of lines. A ray is a li
From playlist Points Lines and Planes
What is a Universal Set? | Don't Memorise
✅To learn more about Sets, enroll in our full course now: https://infinitylearn.com/microcourses?utm_source=youtube&utm_medium=Soical&utm_campaign=DM&utm_content=8innwDI1bv8&utm_term=%7Bkeyword%7D In this video, we will learn: 0:00 what is a universal set? 0:31 what is suitable? 0:35 exa
From playlist Middle School Math - Sets
Emily Riehl: On the ∞-topos semantics of homotopy type theory: The simplicial model of...- Lecture 2
HYBRID EVENT Recorded during the meeting "Logic and Interactions" the February 22, 2022 by the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual M
From playlist Topology
Gluing in Homotopy Type Theory - Michael Shulman
Michael Shulman University of California, San Diego; Member, School of Mathematics March 20, 2013 For more videos, visit http://video.ias.edu
From playlist Mathematics
Martin Hötzel Escardó: Constructive Mathematics in Univalent Type Theory (Lecture I)
The lecture was held within the framework of the Hausdorff Trimester Program: Types, Sets and Constructions
From playlist HIM Lectures: Trimester Program "Types, Sets and Constructions"
The measurement problem and some mild solutions by Dustin Lazarovici (Lecture - 03)
21 November 2016 to 10 December 2016 VENUE Ramanujan Lecture Hall, ICTS Bangalore Quantum Theory has passed all experimental tests, with impressive accuracy. It applies to light and matter from the smallest scales so far explored, up to the mesoscopic scale. It is also a necessary ingredie
From playlist Fundamental Problems of Quantum Physics
Maths for Programmers Tutorial - Full Course on Sets and Logic
Learn the maths and logic concepts that are important for programmers to understand. Shawn Grooms explains the following concepts: ⌨️ (00:00) Tips For Learning ⌨️ (01:32) What Is Discrete Mathematics? ⌨️ (03:45) Sets - What Is A Set? ⌨️ (06:22) Sets - Interval Notation & Common Sets ⌨️ (
From playlist Full Courses in One Video
Topologies of nodal sets of random band limited functions - Peter Sarnak
Peter Sarnak Institute for Advanced Study; Faculty, School of Mathematics March 3, 2014 We discuss various Gaussian ensembles for real homogeneous polynomials in several variables and the question of the distribution of the topologies of the connected components of the zero sets of a typic
From playlist Mathematics
Cedric Koh: Beyond value iteration for parity games: strategy iteration with universal trees
Parity games have witnessed several new quasi-polynomial algorithms since the breakthrough result of Calude et al. (2017). The central combinatorial object underlying these approaches is a universal tree, as identified by Czerwi´nski et al. (2019). By providing a quasi-polynomial lower bou
From playlist Workshop: Tropical geometry and the geometry of linear programming
Building the universe with mathematics - with Manil Suri
How could we create a universe if there was no matter, cosmos or empty space? Could maths be the secret ingredient? Watch the Q&A with Manil here: https://youtu.be/9Q4WvXkXhMs Subscribe for regular science videos: http://bit.ly/RiSubscRibe Explore the natural progression of ideas needed
From playlist Livestreams
Introduction to sets || Set theory Overview - Part 1
A set is the mathematical model for a collection of different things; a set contains elements or members, which can be mathematical objects of any kind: numbers, symbols, points in space, lines, other geometrical shapes, variables, or even other #sets. The #set with no element is the empty
From playlist Set Theory
Infinite Sets and Foundations (Joel David Hamkins) | Ep. 17
Joel David Hamkins is a Professor of Logic with appointments in Philosophy and Mathematics at Oxford University. His main interest is in set theory. We discuss the field of set theory: what it can say about infinite sets and which issues are unresolved, and the relation of set theory to ph
From playlist Daniel Rubin Show, Full episodes