Seminar on Applied Geometry and Algebra (SIAM SAGA): Frank Sottile
Date: Tuesday, August 10 Speaker: Frank Sottile, Texas A&M Title: Applications of Bernstein's Other Theorem Abstract: Many of us are familiar with Bernstein's Theorem giving the number of solutions in the torus to a general system of sparse polynomial equations. The linchpin of his proo
From playlist Seminar on Applied Geometry and Algebra (SIAM SAGA)
The Bernstein Sato polynomial: Bernstein's inequality
This is the second of three talks about the Bernstein-Sato polynomial. The first talk is at https://youtu.be/CX2iej9NKzs The third talk should appear at https://youtu.be/3FLdcrbUXZw on Dec 23 5:00am PST We study the Weyl algebra of differential operators with polynomial coefficients in
From playlist Commutative algebra
Carlo Gasbarri: Liouville’s inequality for transcendental points on projective varieties
Abstract: Liouville inequality is a lower bound of the norm of an integral section of a line bundle on an algebraic point of a variety. It is an important tool in may proofs in diophantine geometry and in transcendence. On transcendental points an inequality as good as Liouville inequality
From playlist Algebraic and Complex Geometry
PROGRAM NAME :WINTER SCHOOL ON STOCHASTIC ANALYSIS AND CONTROL OF FLUID FLOW DATES Monday 03 Dec, 2012 - Thursday 20 Dec, 2012 VENUE School of Mathematics, Indian Institute of Science Education and Research, Thiruvananthapuram Stochastic analysis and control of fluid flow problems have
From playlist Winter School on Stochastic Analysis and Control of Fluid Flow
The Bernstein Sato polynomial: Introduction
This is the first of three talks about the Bernstein-Sato polynomial. The second talk should appear at https://youtu.be/FAKzbvDm-w0 on Dec 22 5:00am PST We define the Bernstein-Sato polynomial of a polynomial in several complex variables, and show how it can be used to analytically con
From playlist Commutative algebra
In this video, I state and prove Grönwall’s inequality, which is used for example to show that (under certain assumptions), ODEs have a unique solution. Basically it says that if a function satisfies a differential equation, but with an inequality, then it must grow sub-exponentially.
From playlist Real Analysis
Jeff Calder: "An intro to concentration of measure with applications to graph-based l... (Part 2/2)"
Watch part 1/2 here: https://youtu.be/Q5fB5Ldzo-g High Dimensional Hamilton-Jacobi PDEs Tutorials 2020 "An introduction to concentration of measure with applications to graph-based learning (Part 2/2)" Jeff Calder, University of Minnesota - Twin Cities Abstract: We will give a gentle in
From playlist High Dimensional Hamilton-Jacobi PDEs 2020
Hajar Bahouri - De l'analyse des EDPs non linéaires à la théorie des groupes
Créteil, Prix Paul Doisteau 2016 Réalisation technique : Antoine Orlandi (GRICAD) | Tous droits réservés
From playlist Des mathématiciens primés par l'Académie des Sciences 2017
Advanced differential equations + boundary value problems
When do differential equations have solutions? This question has fascinated mathematicians for hundreds of years and is discussed at a level suitable for undergraduates. The ideas involve: differential inequalities; fixed point theory; and a modified function approach.
From playlist Mathematical analysis and applications
Riemann Sum Defined w/ 2 Limit of Sums Examples Calculus 1
I show how the Definition of Area of a Plane is a special case of the Riemann Sum. When finding the area of a plane bound by a function and an axis on a closed interval, the width of the partitions (probably rectangles) does not have to be equal. I work through two examples that are rela
From playlist Calculus
Strong refutation of semi-random Boolean CSPs - Venkatesan Guruswami
Computer Science/Discrete Mathematics Seminar I Topic: Strong refutation of semi-random Boolean CSPs Speaker: Venkatesan Guruswami Affiliation: Carnegie Mellon University Date: March 08, 2021 For more video please visit http://video.ias.edu
From playlist Mathematics
Christian Berg: From Herglotz-Nevanlinna functions to completely monotonic functions
CONFERENCE Recorded during the meeting " Herglotz-Nevanlinna Functions and their Applications to Dispersive Systems and Composite Materials " the May 24, 2022 by the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent Find this video a
From playlist Analysis and its Applications
Jeff Calder: "An intro to concentration of measure with applications to graph-based l... (Part 1/2)"
Watch part 2/2 here: https://youtu.be/O20JHvI-MqE High Dimensional Hamilton-Jacobi PDEs Tutorials 2020 "An introduction to concentration of measure with applications to graph-based learning (Part 1/2)" Jeff Calder, University of Minnesota - Twin Cities Abstract: We will give a gentle in
From playlist High Dimensional Hamilton-Jacobi PDEs 2020
Edouard Pauwels: Curiosities and counterexamples in smooth convex optimization
CONFERENCE Recording during the thematic meeting : "Learning and Optimization in Luminy" the October 4, 2022 at the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent Find this video and other talks given by worldwide mathematicians on C
From playlist Control Theory and Optimization
The Bernstein Sato polynomial: Holonomic modules
This is the third of three talks about the Bernstein-Sato polynomial. The first talk is at https://youtu.be/CX2iej9NKzs We use Bernstein's inequality from the second talk to show that holonomic modules have finite length. We then use this to prove that a particular module is holonomic, wh
From playlist Commutative algebra
Solving a linear inequality with fractions
👉 Learn how to solve multi-step linear inequalities having no parenthesis. An inequality is a statement in which one value is not equal to the other value. An inequality is linear when the highest exponent in its variable(s) is 1. (i.e. there is no exponent in its variable(s)). A multi-ste
From playlist Solve and Graph Inequalities | Multi-Step Without Parenthesis
Sharp matrix concentration inequalities - Ramon van Handel
Computer Science/Discrete Mathematics Seminar I Topic: Sharp matrix concentration inequalities Speaker: Ramon van Handel Affiliation: Princeton University Date: October 18, 2021 What does the spectrum of a random matrix look like when we make no assumption whatsoever about the covarianc
From playlist Mathematics
This is a basic introduction to Holder's inequality, which has many applications in mathematics. A simple case in R^n is discussed with a proof provided.
From playlist Mathematical analysis and applications
Cantor-Schroeder-Bernstein -- Proof Writing 24
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From playlist Proof Writing
Solving and graphing a linear inequality
👉 Learn how to solve multi-step linear inequalities having no parenthesis. An inequality is a statement in which one value is not equal to the other value. An inequality is linear when the highest exponent in its variable(s) is 1. (i.e. there is no exponent in its variable(s)). A multi-ste
From playlist Solve and Graph Inequalities | Multi-Step Without Parenthesis