Integer partitions | Enumerative combinatorics
In mathematics, solid partitions are natural generalizations of partitions and plane partitions defined by Percy Alexander MacMahon. A solid partition of is a three-dimensional array of non-negative integers (with indices ) such that and for all Let denote the number of solid partitions of . As the definition of solid partitions involves three-dimensional arrays of numbers, they are also called three-dimensional partitions in notation where plane partitions are two-dimensional partitions and partitions are one-dimensional partitions. Solid partitions and their higher-dimensional generalizations are discussed in the book by Andrews. (Wikipedia).
Math 101 Introduction to Analysis 112515: Introduction to Compact Sets
Introduction to Compact Sets: open covers; examples of finite and infinite open covers; definition of compactness; example of a non-compact set; compact implies closed; closed subset of compact set is compact; continuous image of a compact set is compact
From playlist Course 6: Introduction to Analysis
Math 101 Fall 2017 112917 Introduction to Compact Sets
Definition of an open cover. Definition of a compact set (in the real numbers). Examples and non-examples. Properties of compact sets: compact sets are bounded. Compact sets are closed. Closed subsets of compact sets are compact. Infinite subsets of compact sets have accumulation poi
From playlist Course 6: Introduction to Analysis (Fall 2017)
Partitions of a Set | Set Theory
What is a partition of a set? Partitions are very useful in many different areas of mathematics, so it's an important concept to understand. We'll define partitions of sets and give examples in today's lesson! A partition of a set is basically a way of splitting a set completely into disj
From playlist Set Theory
Ex 1: Volume of a Solid with Known Cross Section Using Integration - Volume by Slices
This video explains how to use integration to find the volume of a solid using slices or with a known cross section. The cross section is a rectangle. Site: http://mathispower4u.com
From playlist Application of Integration: Volume of Solid with Known Cross Section
Every Compact Set in n space is Bounded
Every Compact Set in n space is Bounded If you enjoyed this video please consider liking, sharing, and subscribing. You can also help support my channel by becoming a member https://www.youtube.com/channel/UCr7lmzIk63PZnBw3bezl-Mg/join Thank you:)
From playlist Advanced Calculus
Every Closed Subset of a Compact Space is Compact Proof
Every Closed Subset of a Compact Space is Compact Proof If you enjoyed this video please consider liking, sharing, and subscribing. You can also help support my channel by becoming a member https://www.youtube.com/channel/UCr7lmzIk63PZnBw3bezl-Mg/join Thank you:)
From playlist Topology
This video is about compactness and some of its basic properties.
From playlist Basics: Topology
Ex 2: Volume of a Solid with Known Cross Section Using Integration - Volume by Slices
This video explains how to use integration to find the volume of a solid using slices or with a known cross section. The cross section is a triangle. Site: http://mathispower4u.com
From playlist Application of Integration: Volume of Solid with Known Cross Section
Compact sets enjoy some mysterious properties, which I'll discuss in this video. More precisely, compact sets are always bounded and closed. The beauty of this result lies in the proof, which is an elegant application of this subtle concept. Enjoy! Compactness Definition: https://youtu.be
From playlist Topology
ShmooCon 2013: Forensics - ExFat Bastardized for Cameras
For more information and to download the video visit: http://bit.ly/shmoocon2013 Playlist ShmooCon 2013: http://bit.ly/Shmoo13 Speaker: Scott Moulton In forensics there is a new file system called ExFat. Microsoft has made a deal with the SD Card Association to make ExFat the standard fo
From playlist ShmooCon 2013
Lec 25 | MIT 3.320 Atomistic Computer Modeling of Materials
Case Studies: High Pressure Conclusions View the complete course at: http://ocw.mit.edu/3-320S05 License: Creative Commons BY-NC-SA More information at http://ocw.mit.edu/terms More courses at http://ocw.mit.edu
From playlist MIT 3.320 Atomistic Computer Modeling of Materials
FEM@LLNL | Efficient Techniques for Fluid Structure Interaction
Sponsored by the MFEM project, the FEM@LLNL Seminar Series focuses on finite element research and applications talks of interest to the MFEM community. On July 26, 2022, Jeffrey Banks of Rensselaer Polytechnic Institute presented "Efficient Techniques for Fluid Structure Interaction: Comp
From playlist FEM@LLNL Seminar Series
Phase transitions in hard-core systems by Deepak Dhar ( Lecture - 1 )
PROGRAM BANGALORE SCHOOL ON STATISTICAL PHYSICS - X ORGANIZERS : Abhishek Dhar and Sanjib Sabhapandit DATE : 17 June 2019 to 28 June 2019 VENUE : Ramanujan Lecture Hall, ICTS Bangalore This advanced level school is the tenth in the series. This is a pedagogical school, aimed at bridgin
From playlist Bangalore School on Statistical Physics - X (2019)
19. Interacting Particles Part 5
MIT 8.333 Statistical Mechanics I: Statistical Mechanics of Particles, Fall 2013 View the complete course: http://ocw.mit.edu/8-333F13 Instructor: Mehran Kardar This is the fifth of five lectures on Interacting Particles. License: Creative Commons BY-NC-SA More information at http://ocw.
From playlist MIT 8.333 Statistical Mechanics I: Statistical Mechanics of Particles, Fall 2013
Multiple Phase Transitions in a System of Hard Core Rotors on a Lattice (Lecture 1) by Deepak Dhar
INFOSYS-ICTS CHANDRASEKHAR LECTURES MULTIPLE PHASE TRANSITIONS IN A SYSTEM OF HARD CORE ROTORS ON A LATTICE SPEAKER: Deepak Dhar (Distinguished Emeritus Professor and NASI-Senior Scientist, IISER-Pune, India) VENUE: Ramanujan Lecture Hall and Online DATE & TIME: Lecture 1: Monday, D
From playlist Infosys-ICTS Chandrasekhar Lectures
Lec 29 | MIT 5.60 Thermodynamics & Kinetics, Spring 2008
Lecture 29: Applications: chemical and phase equilibria. View the complete course at: http://ocw.mit.edu/5-60S08 License: Creative Commons BY-NC-SA More information at http://ocw.mit.edu/terms More courses at http://ocw.mit.edu
From playlist MIT 5.60 Thermodynamics & Kinetics, Spring 2008
Marius Junge: Operator valued q gaussian algebras
Marius Junge: Operator valued q-gaussian algebras Abstract: We consider a particular example of algebras given by generators and relations. Indeed, q-deformations of the classical gaussian variables have obtained a fair amount of attention through recent work of Darbrowski, Guionnet, Nels
From playlist HIM Lectures: Trimester Program "Von Neumann Algebras"
Lauren Williams: Newton-Okounkov bodies for Grassmannians
Abstract: In joint work with Konstanze Rietsch (arXiv:1712.00447), we use the X-cluster structure on the Grassmannian and the combinatorics of plabic graphs to associate a Newton-Okounkov body to each X-cluster. This gives, for each X-cluster, a toric degeneration of the Grassmannian. We a
From playlist Combinatorics
Ex: Volume of a Solid With Slices Parallel to X-axis (Triangle)
This video explains how to determine the volume of a solid with a known cross section parallel to the x-axis.
From playlist Application of Integration: Volume of Solid with Known Cross Section
Operating System Full Course | Operating System Tutorials for Beginners
An operating system is system software that manages computer hardware and software resources and provides common services for computer programs. In this operating system full course you will be learning following topic in details. Hardware Resources Introduction
From playlist Operating System