Critical phenomena | Percolation theory
Percolation surface critical behavior concerns the influence of surfaces on the critical behavior of percolation. (Wikipedia).
An explanation of the temperature dependence of critical stress for various deformation mechanisms in materials.
From playlist Ceramic Material Properties
Bond percolation on a square lattice. Each edge of the lattice is open with probability p, independently of all others. p is varied from 0 to 1. For more details on the simulations, see http://www.univ-orleans.fr/mapmo/membres/berglund/ressim.html
From playlist Percolation
Chemistry - Liquids and Solids (54 of 59) Phase Change: Critical Temperature and Pressure
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain of the phase changes of critical temperature and pressure.
From playlist CHEMISTRY 16 LIQUIDS AND SOLIDS
Bond percolation on a square lattice. Each edge of the lattice is open with probability p, independently of all others. p is varied from 0 to 1. The connected component of the left-hand boundary is highlighted. It touches the right-hand boundary for p close to 0.5. For more information,
From playlist Percolation
Bernoulli site percolation on a Poisson disc process
Several recent videos on this channel have shown percolation on regular lattices. This simulation shows for a change percolation on a random lattice. The vertices of the lattice form a Poisson disc process, which is similar to a Poisson point process (points thrown independently and unifor
From playlist Percolation
Surface Tension of Water, Capillary Action, Cohesive and Adhesive Forces - Work & Potential Energy
This physics video tutorial provides a basic introduction into the surface tension of water. Surface tension prevents small amounts of water from flattening out across a surface. Rather, it causes water to minimize its surface area and as a result, water forms small beadlike droplets. T
From playlist New Physics Video Playlist
Universality Classes of avalanches in sandpiles and growing interfaces by Deepak Dhar
PROGRAM :UNIVERSALITY IN RANDOM STRUCTURES: INTERFACES, MATRICES, SANDPILES ORGANIZERS :Arvind Ayyer, Riddhipratim Basu and Manjunath Krishnapur DATE & TIME :14 January 2019 to 08 February 2019 VENUE :Madhava Lecture Hall, ICTS, Bangalore The primary focus of this program will be on the
From playlist Universality in random structures: Interfaces, Matrices, Sandpiles - 2019
Viscosity, Cohesive and Adhesive Forces, Surface Tension, and Capillary Action
Liquids have some very interesting properties, by virtue of the intermolecular forces they make, both between molecules of the liquid and those between the liquid and some other material they are in contact with. Let's learn about viscosity, cohesive and adhesive forces, surface tension, a
From playlist General Chemistry
Remco van der Hofstad - Hypercube percolation
Consider bond percolation on the hypercube {0,1}^n at the critical probability p_c defined such that the expected cluster size equals 2^{n/3}, where 2^{n/3} acts as the cube root of the number of vertices of the n-cube. Percolation on the Hamming cube was proposed by Erdös and Spencer (197
From playlist Les probabilités de demain 2017
Nodal Lines of Maass Forms and Critical Percolation - Peter Sarnak
Peter Sarnak Institute for Advanced Study March 20, 2012 We describe some results concerning the number of connected components of nodal lines of high frequency Maass forms on the modular surface. Based on heuristics connecting these to a critical percolation model, Bogomolny and Schmit ha
From playlist Mathematics
GFF Level-Set Percolation (Lecture-4) by Subhajit Goswami
PROGRAM: PROBABILISTIC METHODS IN NEGATIVE CURVATURE (ONLINE) ORGANIZERS: Riddhipratim Basu (ICTS - TIFR, Bengaluru), Anish Ghosh (TIFR, Mumbai) and Mahan M J (TIFR, Mumbai) DATE & TIME: 01 March 2021 to 12 March 2021 VENUE: Online Due to the ongoing COVID pandemic, the meeting will
From playlist Probabilistic Methods in Negative Curvature (Online)
Continuum Percolation in Random Environments by Benedikt Jahnel
PROGRAM: TOPICS IN HIGH DIMENSIONAL PROBABILITY ORGANIZERS: Anirban Basak (ICTS-TIFR, India) and Riddhipratim Basu (ICTS-TIFR, India) DATE & TIME: 02 January 2023 to 13 January 2023 VENUE: Ramanujan Lecture Hall This program will focus on several interconnected themes in modern probab
From playlist TOPICS IN HIGH DIMENSIONAL PROBABILITY
From playlist Plenary talks One World Symposium 2020
Marie Albenque: Geometry of the sign clusters in the infinite Ising-weighted triangulation
HYBRID EVENT Recorded during the meeting "Random Geometry" the January 17, 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 Mathematics
From playlist Probability and Statistics
Refraction (4 of 5) Calculating the Critical Angle
Shows how to calculate the critical angle for total internal reflection. Total internal reflection is the complete reflection of a ray of light that is traveling within one medium, such as water or glass, from the boundary with a second medium back into the first medium. The phenomenon oc
From playlist Optics: Ray Diagrams, Reflection, Refraction, Thin Lens Equation
Universality in sandpile models by Pradeep Kumar Mohanty
PROGRAM :UNIVERSALITY IN RANDOM STRUCTURES: INTERFACES, MATRICES, SANDPILES ORGANIZERS :Arvind Ayyer, Riddhipratim Basu and Manjunath Krishnapur DATE & TIME :14 January 2019 to 08 February 2019 VENUE :Madhava Lecture Hall, ICTS, Bangalore The primary focus of this program will be on the
From playlist Universality in random structures: Interfaces, Matrices, Sandpiles - 2019
Total Internal Reflection & The Critical Angle, Optics - Physics
This physics video tutorial on optics provides a basic introduction into total internal reflection. It explains how to calculate the critical angle. If the incident angle is less than the critical angle, refraction will occur. If the incident angle equals the critical angle, the refract
From playlist New Physics Video Playlist
Aspects of Eternal Inflation, part 2 - Leonard Susskind
Aspects of Eternal Inflation, part 2 Leonard Susskind Stanford University July 19, 2011
From playlist PiTP 2011
Percolation on Nonamenable Groups, Old and New (Lecture-2) by Tom Hutchcroft
PROGRAM: PROBABILISTIC METHODS IN NEGATIVE CURVATURE (ONLINE) ORGANIZERS: Riddhipratim Basu (ICTS - TIFR, Bengaluru), Anish Ghosh (TIFR, Mumbai) and Mahan M J (TIFR, Mumbai) DATE & TIME: 01 March 2021 to 12 March 2021 VENUE: Online Due to the ongoing COVID pandemic, the meeting will
From playlist Probabilistic Methods in Negative Curvature (Online)
Videos for Transport Phenomena course at Olin College Classic heat transfer problem of sudden quenching.
From playlist Lectures for Transport Phenomena course