Ordinary differential equations
In mathematics, the equations governing the isomonodromic deformation of meromorphic linear systems of ordinary differential equations are, in a fairly precise sense, the most fundamental exact nonlinear differential equations. As a result, their solutions and properties lie at the heart of the field of exact nonlinearity and integrable systems. Isomonodromic deformations were first studied by Richard Fuchs, with early pioneering contributions from Lazarus Fuchs, Paul Painlevé, René Garnier, and Ludwig Schlesinger. Inspired by results in statistical mechanics, a seminal contribution to the theory was made by Michio Jimbo, Tetsuji Miwa, and , who studied cases with arbitrary singularity structure. (Wikipedia).
Elastic Deformation and Plastic Deformation | Mechanical Properties of Solids | Don't Memorise
Deformation is simply a change in the shape of a body caused by a Force. But what can be Elastic Deformation and Plastic Deformations? (Mechanical Properties of Solids) We know that when a Spring is Stretched or Compressed it goes back to original shape when released. Why is that? what i
From playlist Physics
AWESOME Electromagnetic force oscillation!!!
In this video i show electromagnetic force oscillation on a ruler. Also i demonstrate the standing wave on a ruler!
From playlist ELECTROMAGNETISM
Deformation via dislocation motion
Deformation can occur as dislocations move through a material. Edge and screw dislocations move in perpendicular directions to achieve the same deformation. Edge dislocations move with shear force direction while screw dislocations move perpendicular. Dislocation density can be calculated
From playlist Materials Sciences 101 - Introduction to Materials Science & Engineering 2020
F. Loray - Painlevé equations and isomonodromic deformations II (Part 2)
Abstract - In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connection
From playlist Ecole d'été 2019 - Foliations and algebraic geometry
F. Loray - Painlevé equations and isomonodromic deformations II (Part 1)
Abstract - In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connection
From playlist Ecole d'été 2019 - Foliations and algebraic geometry
F. Loray - Painlevé equations and isomonodromic deformations II (Part 4)
In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connections. We will
From playlist Ecole d'été 2019 - Foliations and algebraic geometry
F. Loray - Painlevé equations and isomonodromic deformations II (Part 3)
Abstract - In these lectures, we use the material of V. Heu and H. Reis' lectures to introduce and study Painlevé equations from the isomonodromic point of view. The main objects are rank 2 systems of linear differential equations on the Riemann sphere, or more generally, rank 2 connection
From playlist Ecole d'été 2019 - Foliations and algebraic geometry
Moduli space of regular singular parabolic connections and isomonodromic deformation by M.Inaba
Program :Quantum Fields, Geometry and Representation Theory ORGANIZERS : Aswin Balasubramanian, Saurav Bhaumik, Indranil Biswas, Abhijit Gadde, Rajesh Gopakumar and Mahan Mj DATE & TIME : 16 July 2018 to 27 July 2018 VENUE : Madhava Lecture Hall, ICTS, Bangalore The power of symmetries
From playlist Quantum Fields, Geometry and Representation Theory
Special Relativity C3 Length Contraction
Relativistic length contraction.
From playlist Physics - Special Relativity
Physics - Thermodynamics: (21 of 22) Change Of State: Process Summary
Visit http://ilectureonline.com for more math and science lectures! In this video I will give a summery of isobaric, isovolumetric, isothermic, and adiabatic process.
From playlist PHYSICS - THERMODYNAMICS
In this video we will explore torsion, which is the twisting of an object caused by a moment. It is a type of deformation. A moment which tends to cause twisting is called torque. Some of the things covered in this video include how circular bars deform under torsion, how we can calculate
From playlist Mechanics of Materials / Strength of Materials
Holomorphic Curves in Compact Quotients of SL(2,C) by Sorin Dumitrescu
DISCUSSION MEETING TOPICS IN HODGE THEORY (HYBRID) ORGANIZERS: Indranil Biswas (TIFR, Mumbai, India) and Mahan Mj (TIFR, Mumbai, India) DATE: 20 February 2023 to 25 February 2023 VENUE: Ramanujan Lecture Hall and Online This is a followup discussion meeting on complex and algebraic ge
From playlist Topics in Hodge Theory - 2023
Moduli of connections on curves: some examples by Frank Loray
20 March 2017 to 25 March 2017 VENUE: Ramanujan Lecture Hall, ICTS, Bengaluru Complex analytic geometry is a very broad area of mathematics straddling differential geometry, algebraic geometry and analysis. Much of the interactions between mathematics and theoretical physics, especially
From playlist Complex Geometry
Special Relativity C2 Length Contraction
Relativistic length contraction.
From playlist Physics - Special Relativity
Stress & Strain - Elastic Modulus & Shear Modulus Practice Problems - Physics
This physics video tutorial provides practice problems associated with the elastic modulus and shear modulus of materials. It explains how to calculate the stress and strain of materials when an external force is applied. Stress is the ratio of force and area. Strain is the ratio of the
From playlist New Physics Video Playlist
Giordano Cotti: Dubrovin’s conjecture - an overview
HYBRID EVENT Recorded during the meeting "D-Modules: Applications to Algebraic Geometry, Arithmetic and Mirror Symmetry" the April 12, 2022 by the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent Find this video and other talks given
From playlist Algebraic and Complex Geometry
Unfolding of the moduli space of unramified irregular singular connections by M.Inaba
Program: Quantum Fields, Geometry and Representation Theory ORGANIZERS : Aswin Balasubramanian, Saurav Bhaumik, Indranil Biswas, Abhijit Gadde, Rajesh Gopakumar and Mahan Mj DATE & TIME : 16 July 2018 to 27 July 2018 VENUE : Madhava Lecture Hall, ICTS, Bangalore The power of symmetries
From playlist Quantum Fields, Geometry and Representation Theory
Polarization of Light: circularly polarized, linearly polarized, unpolarized light.
3D animations explaining circularly polarized, linearly polarized, and unpolarized electromagnetic waves.
From playlist Physics
Gabriele Rembado - Moduli Spaces of Irregular Singular Connections: Quantization and Braiding
Holomorphic connections on Riemann surfaces have been widely studied, as well as their monodromy representations. Their moduli spaces have natural Poisson/symplectic structures, and they can be both deformed and quantized: varying the Riemann surface structure leads to the action of mappin
From playlist Workshop on Quantum Geometry