In mathematics, a cardinal λ < Θ is a Suslin cardinal if there exists a set P ⊂ 2ω such that P is λ-Suslin but P is not λ'-Suslin for any λ' < λ. It is named after the Russian mathematicianMikhail Yakovlevich Suslin (1894–1919). (Wikipedia).
"Natural SUSY vs. the LHC” by David Shih
Saturday, September 17, 2016
From playlist Natural Sciences
Natural SUSY vs. the LHC - David Shih
NatiFest - September 16, 2016 "Natural SUSY vs. the LHC” by David Shih www.sns.ias.edu More videos on http://video.ias.edu
From playlist Natural Sciences
SUSY and Naturalness (1 of 2) - Natalia Toro
Natalia Toro Perimeter Institute July 18, 2013 More videos on http://video.ias.edu
From playlist Natural Sciences
Mirna Džamonja: Universal א2-Aronszajn trees
Recorded during the meeting "XVI International Luminy Workshop in Set Theory" the September 14, 2021 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 Au
From playlist Logic and Foundations
First year with the Supra. Imported it from Japan and rebuilt it to single turbo and had some fun! Filmed and edited 2006. Uploaded at Youtube 2013
From playlist My Supra 1294 RWHP
(October 8, 2012) Leonard Susskind continues his discussion of Riemannian geometry and uses it as a foundation for general relativity. This series is the fourth installment of a six-quarter series that explore the foundations of modern physics. In this quarter, Susskind focuses on Einst
From playlist Lecture Collection | General Relativity
SUSY and Naturalness (2 of 2) - Natalia Toro
Natalia Toro Perimeter Institute July 19, 2013 More videos on http://video.ias.edu
From playlist Natural Sciences
(October 1, 2012) Leonard Susskind introduces some of the building blocks of general relativity including proper notation and tensor analysis. This series is the fourth installment of a six-quarter series that explore the foundations of modern physics. In this quarter, Susskind focuses o
From playlist Lecture Collection | General Relativity
Björcks Busbil 2007 Teaser Supra
Just a little video about my supra.
From playlist My Supra 1294 RWHP
Schemes 33: Vector bundles on the projective line
This lecture is part of an online algebraic geometry course on schemes, based on chapter II of "Algebraic geometry" by Hartshorne. We prove Grothendieck's theorem that all vector bundles over the projective line are sums of line bundles, and compare the category of vector bundles with the
From playlist Algebraic geometry II: Schemes
Ivan Panin - 1/3 A Local Construction of Stable Motivic Homotopy Theory
Notes: https://nextcloud.ihes.fr/index.php/s/dDbMXEc36JQyKts V. Voevodsky [6] invented the category of framed correspondences with the hope to give a new construction of stable motivic homotopy theory SH(k) which will be more friendly for computational purposes. Joint with G. Garkusha we
From playlist Summer School 2020: Motivic, Equivariant and Non-commutative Homotopy Theory
Commutative algebra 39 (Stably free modules)
This lecture is part of an online course on commutative algebra, following the book "Commutative algebra with a view toward algebraic geometry" by David Eisenbud. We discuss the relation between stably free and free modules. We first give an example of a stably free module that is not fre
From playlist Commutative algebra
Stereolab - Kybernetická Babička Pt. 1
From "Fab Four Suture" (2006)
From playlist the absolute best of stereolab
Ivan Panin 2/3 - A Local Construction of Stable Motivic Homotopy Theory
Notes: https://nextcloud.ihes.fr/index.php/s/dDbMXEc36JQyKts V. Voevodsky [6] invented the category of framed correspondences with the hope to give a new construction of stable motivic homotopy theory SH(k) which will be more friendly for computational purposes. Joint with G. Garkusha we
From playlist Summer School 2020: Motivic, Equivariant and Non-commutative Homotopy Theory
Ivan Panin 3/3 - A Local Construction of Stable Motivic Homotopy Theory
Notes: https://nextcloud.ihes.fr/index.php/s/dDbMXEc36JQyKts V. Voevodsky [6] invented the category of framed correspondences with the hope to give a new construction of stable motivic homotopy theory SH(k) which will be more friendly for computational purposes. Joint with G. Garkusha we
From playlist Summer School 2020: Motivic, Equivariant and Non-commutative Homotopy Theory
Counting Woodin cardinals in HOD
Distinguished Visitor Lecture Series Counting Woodin cardinals in HOD W. Hugh Woodin Harvard University, USA and University of California, Berkeley, USA
From playlist Distinguished Visitors Lecture Series
Determine Sum of the Cardinality of the Union and Intersection of Two Sets
This video explains how to determine the sum of the cardinality of the union and intersection of two sets.
From playlist Counting (Discrete Math)
Does Infinite Cardinal Arithmetic Resemble Number Theory? - Menachem Kojman
Menachem Kojman Ben-Gurion University of the Negev; Member, School of Mathematics February 28, 2011 I will survey the development of modern infinite cardinal arithmetic, focusing mainly on S. Shelah's algebraic pcf theory, which was developed in the 1990s to provide upper bounds in infinit
From playlist Mathematics
Special Relativity | Lecture 9
(June 11, 2012) Leonard Susskind discusses plane electromagnetic waves in regards to Maxwell's equations. He then looks for a Lagrangian formulation of Maxwell's equations in order to support the laws of conservation. In 1905, while only twenty-six years old, Albert Einstein published "O
From playlist Lecture Collection | Special Relativity
Laura Fontanella: Reflection of stationary sets and the tree property at ℵω2+1
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities: - Chapter markers and keywords to watch the parts of your choice in the video - Videos enriched with abstracts, b
From playlist Logic and Foundations