The hidden meanings of yin and yang - John Bellaimey
View full lesson here: http://ed.ted.com/lessons/the-hidden-meanings-of-yin-and-yang-john-bellaimey The ubiquitous yin-yang symbol holds its roots in Taoism/Daoism, a Chinese religion and philosophy. The yin, the dark swirl, is associated with shadows, femininity, and the trough of a wave
From playlist The Way We Think
The Story of Chinese Character :丼
丼 depicts a well which is surrounded by railings with an object inside it. Both 丼 and 井 came from the same origin and shared the same meaning in the past. However, now we seldom use 丼 to describe a well, 丼 is used as a onomatopoeia which imitates the sound of something drops in the water (
From playlist The Story of HanZi (Chinese Characters)
The Story of Chinese Character : 尒
尒 is the simplified form of爾, which depicts an arrow. Arrow look like a sign of indicating a direction, so尒 is used to represent person being addressed(you), now we use你 instead.
From playlist The Story of HanZi (Chinese Characters)
Integrability in Planar AdS/CFT, Yangian Symmetry and Applications (Lecture 3) by Niklas Beisert
Infosys-ICTS String Theory Lectures Integrability in Planar AdS/CFT, Yangian Symmetry and Applications Speaker: Niklas Beisert (ETH Zurich) Date: 13 May 2019 to 15 May 2019 Venue: Emmy Noether Seminar Room, ICTS Bangalore Lecture 1: May 13, 2019 at 11:30 am Lecture 2: May 14, 2019
From playlist Infosys-ICTS String Theory Lectures
The Story of Chinese Character :臼
臼 depicts a mortar.
From playlist The Story of HanZi (Chinese Characters)
First session Yang's TaiChi: Beginning (Practice)
Follow me, repeat three times.
From playlist The Beauty of Yang's Tai Chi (太極)
Integrability in Planar AdS/CFT, Yangian Symmetry and Applications (Lecture 1) by Niklas Beisert
Infosys-ICTS String Theory Lectures Integrability in Planar AdS/CFT, Yangian Symmetry and Applications Speaker: Niklas Beisert (ETH Zurich) Date: 13 May 2019 to 15 May 2019 Venue: Emmy Noether Seminar Room, ICTS Bangalore Lecture 1: May 13, 2019 at 11:30 am Lecture 2: May 14, 2019
From playlist Infosys-ICTS String Theory Lectures
Integrability in Planar AdS/CFT, Yangian Symmetry and Applications (Lectre 2) by Niklas Beisert
Infosys-ICTS String Theory Lectures Integrability in Planar AdS/CFT, Yangian Symmetry and Applications Speaker: Niklas Beisert (ETH Zurich) Date: 13 May 2019 to 15 May 2019 Venue: Emmy Noether Seminar Room, ICTS Bangalore Lecture 1: May 13, 2019 at 11:30 am Lecture 2: May 14, 2019
From playlist Infosys-ICTS String Theory Lectures
The Story of Chinese Character : 夃
夃 is composed of 乃(therefore) and 又(also). 乃 depicts a rope, while 又 is the picture of a hand, 夃 depicts a hand pulling a rope, which has the meaning of getting something, so 夃 means ‘more’.
From playlist The Story of HanZi (Chinese Characters)
Generalized affine Grassmannian slices, truncated shifted Yangians, Hamiltonian... - Joel Kamnitzer
Virtual Workshop on Recent Developments in Geometric Representation Theory Topic: Generalized affine Grassmannian slices, truncated shifted Yangians, and Hamiltonian reduction Speaker: Joel Kamnitzer Affiliation: University of Toronto Date: November 19, 2020 For more video please visit h
From playlist Virtual Workshop on Recent Developments in Geometric Representation Theory
The Story of Chinese Character : 鼐
鼐 is composed of 乃 and 鼎. 鼎 is the picture of an ancient Chinese cooking cauldron, while 乃 depicts a rope, which has the meaning of pulling and abundance, so 鼐 means a big cauldron.
From playlist The Story of HanZi (Chinese Characters)
Joel Kamnitzer: Symplectic duality and (generalized) affine Grassmannian slices
Abstract: Under the geometric Satake equivalence, slices in the affine Grassmannian give a geometric incarnation of dominant weight spaces in representations of reductive groups. These affine Grassmannian slices are quantized by algebras known as truncated shifted Yangians. From this persp
From playlist SMRI Algebra and Geometry Online
Oded Yacobi: Cylindrical KLR algebras and slices in the affine Grassmannian
The lecture was held within the framework of the Hausdorff Trimester Program: Symplectic Geometry and Representation Theory. Abstract: I will give an overview of a program to study quantizations of slices in the affine Grassmannian of a semisimple group G. The slices are interesting Poiss
From playlist HIM Lectures: Trimester Program "Symplectic Geometry and Representation Theory"
Vasily Pestun - 2/4 Quantum gauge theories and integrable systems
Seiberg-Witten theory maps supersymmetric four-dimensional gauge theories with extended supersymmetry to algebraic completely integrable systems. For large class of such integrable systems the phase space is the moduli space of solutions of self-dual hyperKahler equations and their low-dim
From playlist Vasily Pestun - Quantum gauge theories and integrable system
Vasily Pestun - 3/4 Quantum gauge theories and integrable systems
Seiberg-Witten theory maps supersymmetric four-dimensional gauge theories with extended supersymmetry to algebraic completely integrable systems. For large class of such integrable systems the phase space is the moduli space of solutions of self-dual hyperKahler equations and their low-dim
From playlist Vasily Pestun - Quantum gauge theories and integrable system
Vasily Pestun - 4/4 Quantum gauge theories and integrable systems
Seiberg-Witten theory maps supersymmetric four-dimensional gauge theories with extended supersymmetry to algebraic completely integrable systems. For large class of such integrable systems the phase space is the moduli space of solutions of self-dual hyperKahler equations and their low-dim
From playlist Vasily Pestun - Quantum gauge theories and integrable system
Joel Kamnitzer: Categorical g-actions for modules over truncated shifted Yangians
CIRM VIRTUAL CONFERENCE Given a representation V of a reductive group G, Braverman-Finkelberg-Nakajima defined a Poisson variety called the Coulomb branch, using a convolution algebra construction. This variety comes with a natural deformation quantization, called a Coulomb branch algebr
From playlist Virtual Conference
