Basic Methods: We introduce the basic set operations of union, intersection, and complement, which mirror the logical constructions of or, and, and not. We note the main laws for these set operations and give more examples of double inclusion proofs. Finally we consider indexed families
From playlist Math Major Basics
Introduction to Sets and Set Notation
This video defines a set, special sets, and set notation.
From playlist Sets (Discrete Math)
Determine Sets Given Using Set Notation (Ex 2)
This video provides examples to describing a set given the set notation of a set.
From playlist Sets (Discrete Math)
Operations on Sets | Axiomatic Set Theory, Section 1.2
We define some basic operations on sets using the axioms of ZFC. My Twitter: https://twitter.com/KristapsBalodi3 Intersection:(0:00) Ordered Tuples/Products:(4:45)
From playlist Axiomatic Set Theory
Set Theory (Part 3): Ordered Pairs and Cartesian Products
Please feel free to leave comments/questions on the video and practice problems below! In this video, I cover the Kuratowski definition of ordered pairs in terms of sets. This will allow us to speak of relations and functions in terms of sets as the basic mathematical objects and will ser
From playlist Set Theory by Mathoma
Sets might contain an element that can be identified as an identity element under some binary operation. Performing the operation between the identity element and any arbitrary element in the set must result in the arbitrary element. An example is the identity element for the binary opera
From playlist Abstract algebra
What are Binary Operations? | Abstract Algebra
What are binary operations? Binary operations are a vital part of the study of abstract algebra, and we'll be introducing them with examples and proofs in this video lesson! A binary operation on a set S is simply a function f from SxS to S. So a binary operation is a function that takes
From playlist Abstract Algebra
Fuzzy Logic Systems - Part 4: Knowledge Based and Fuzzy Inference Engine
This video is about Fuzzy Logic Systems - Part 4: Knowledge Based and Fuzzy Inference Engine
From playlist Fuzzy Logic
Introduction to sets || Set theory Overview - Part 2
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
Lisa Glaser: A picture of a spectral triple
Talk at the conference "Noncommutative geometry meets topological recursion", August 2021, University of Münster. Abstract: A compact manifold can be described through a spectral triple, consisting of a Hilbert space H, an algebra of functions A and a Dirac operator D. But what if we are g
From playlist Noncommutative geometry meets topological recursion 2021
23C3: A Natural Language Database Interface using Fuzzy Semantics
Speaker: Richard Bergmair We give a thorough exposition of our natural language database interface that produces result sets ranked according to the degree to which database records fulfill our intuitions about vague expressions in natural language such as `a small rainy city near San Fr
From playlist 23C3: Who can you trust
Fuzzy Logic Systems - Part 6: Three Fuzzy Inference Systems
This video is about Fuzzy Logic Systems - Part 6: Three Fuzzy Inference Systems
From playlist Fuzzy Logic
Set Theory (Part 11): Ordering of the Natural Numbers
Please feel free to leave comments/questions on the video and practice problems below! In this video, we utilize the definition of natural number to speak of ordering on the set of all natural numbers. In addition, the well-ordering principle and trichotomy law are proved.
From playlist Set Theory by Mathoma
Denjoe O’Connor - Non-perturbative Studies of Membrane Matrix Models
https://indico.math.cnrs.fr/event/4272/attachments/2260/2719/IHESConference_Denjoe_OCONNOR.pdf
From playlist Space Time Matrices
3. Quantum description of light, Part 1
MIT 8.422 Atomic and Optical Physics II, Spring 2013 View the complete course: http://ocw.mit.edu/8-422S13 Instructor: Wolfgang Ketterle In this lecture, the professor discussed single mode light, thermal states, coherent states, etc. License: Creative Commons BY-NC-SA More information a
From playlist MIT 8.422 Atomic and Optical Physics II, Spring 2013
Gravitational wave Memory Signals from Binary orbits and Soft-Graviton Theorems by Subhendra Mohanty
PROGRAM LESS TRAVELLED PATH TO THE DARK UNIVERSE ORGANIZERS: Arka Banerjee (IISER Pune), Subinoy Das (IIA, Bangalore), Koushik Dutta (IISER, Kolkata), Raghavan Rangarajan (Ahmedabad University) and Vikram Rentala (IIT Bombay) DATE & TIME: 13 March 2023 to 24 March 2023 VENUE: Ramanujan
From playlist LESS TRAVELLED PATH TO THE DARK UNIVERSE
Morrey's conjecture - László Székelyhidi
Members’ Colloquium Topic: Morrey's conjecture Speaker: László Székelyhidi Affiliation: University of Leipzig; Distinguished Visiting Professor, School of Mathematics Date: February 14, 2022 Morrey’s conjecture arose from a rather innocent looking question in 1952: is there a local condi
From playlist Mathematics
Source Boston 2010: Cloudiforniction Redux: Predicting The Future State Of Cloud Computing 3/7
Clip 3/7 Speaker: Chris Hoff, Cisco Systems Where and how our data is created, processed, accessed, stored, backed up and destroyed in what are sure to become massively overlaid cloud-based services - and by whom and using whose infrastructure - yields significant concerns related to secu
From playlist SOURCE Boston 2010
This video explains how to use the SELECT statement of the Structured Query Language (SQL). It is the first in a series about a subset of SQL known as the Data Manipulation Language (DML), which is used to work with the data in database tables. It includes examples of the use of a column
From playlist Databases
How to Identify the Elements of a Set | Set Theory
Sets contain elements, and sometimes those elements are sets, intervals, ordered pairs or sequences, or a slew of other objects! When a set is written in roster form, its elements are separated by commas, but some elements may have commas of their own, making it a little difficult at times
From playlist Set Theory