Characteristic Polynomials of the Hermitian Wigner and Sample Covariance Matrices - Shcherbina
Tatyana Shcherbina Institute for Low Temperature Physics, Kharkov November 1, 2011 We consider asymptotics of the correlation functions of characteristic polynomials of the hermitian Wigner matrices Hn=n−1/2WnHn=n−1/2Wn and the hermitian sample covariance matrices Xn=n−1A∗m,nAm,nXn=n−1Am,n
From playlist Mathematics
Light-rays and detectors in Wilson-Fisher theory - Petr Kravchuk
High Energy Theory Seminar Topic: Light-rays and detectors in Wilson-Fisher theory Speaker: Petr Kravchuk Affiliation: Member, School of Natural Sciences, IAS Friday, September 18, 2020 For more video please visit http://video.ias.edu
From playlist Natural Sciences
Timothy Snyder: The Making of Modern Ukraine. Class 19. Oligarchies in Russia and Ukraine
Class 19 examines additional reminders of the impact Poland had on the formation of the Ukrainian state. Timothy Snyder is the Richard C. Levin Professor of History at Yale University and a permanent fellow at the Institute for Human Sciences in Vienna. He speaks five and reads ten Europea
From playlist Timothy Snyder: The Making of Modern Ukraine
Dalimil Mazáč - Bootstrapping Automorphic Spectra
I will explain how the conformal bootstrap can be adapted to place rigorous bounds on the spectra of automorphic forms on locally symmetric spaces. A locally symmetric space is of the form H\G/K, where G is a non-compact semisimple Lie group, K the maximal compact subgroup of G, and H a di
From playlist Quantum Encounters Seminar - Quantum Information, Condensed Matter, Quantum Field Theory
What is the definition of a polynomial with examples and non examples
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Classify Polynomials
Bootstrapping Automorphic Spectra - Dalimil Mazac
IAS Physics Group Meeting Topic: Bootstrapping Automorphic Spectra Speaker: Dalimil Mazac Affiliation: Member, School of Natural Sciences, IAS Date: November 10, 2021 I will explain how the conformal bootstrap can be adapted to place rigorous bounds on the spectra of automorphic forms o
From playlist Natural Sciences
Bounds on Maass spectra from holomorphic forms - Dalimil Mazac
Mathematical Physics Seminar Topic: Bounds on Maass spectra from holomorphic forms Speaker: Dalimil Mazac Affiliation: Member, School of Natural Sciences Date: March 02, 2022 I will discuss new constraints on the spectra of Maass forms on compact hyperbolic 2-orbifolds. The constraints a
From playlist Mathematics
Norbert Mauser: The quantum Vlasov equation
Abstract: We present the Quantum Vlasov or Wigner equation as a "phase space" presentation of quantum mechanics that is close to the classical Vlasov equation, but where the "distribution function" w(x,v,t) will in general have also negative values. We discuss the relation to the classical
From playlist Mathematical Physics
Many-body strategies for multi-qubit gates by Kareljan Schoutens
PROGRAM: INTEGRABLE SYSTEMS IN MATHEMATICS, CONDENSED MATTER AND STATISTICAL PHYSICS ORGANIZERS: Alexander Abanov, Rukmini Dey, Fabian Essler, Manas Kulkarni, Joel Moore, Vishal Vasan and Paul Wiegmann DATE : 16 July 2018 to 10 August 2018 VENUE: Ramanujan Lecture Hall, ICTS Bangalore
From playlist Integrable systems in Mathematics, Condensed Matter and Statistical Physics
Maxim Kazarian - 1/3 Mathematical Physics of Hurwitz numbers
Hurwitz numbers enumerate ramified coverings of a sphere. Equivalently, they can be expressed in terms of combinatorics of the symmetric group; they enumerate factorizations of permutations as products of transpositions. It turns out that these numbers obey a huge num
From playlist Physique mathématique des nombres de Hurwitz pour débutants
What is the definition of a monomial and polynomials with examples
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Classify Polynomials
Maxim Kazarian - 2/3 Mathematical Physics of Hurwitz numbers
Hurwitz numbers enumerate ramified coverings of a sphere. Equivalently, they can be expressed in terms of combinatorics of the symmetric group; they enumerate factorizations of permutations as products of transpositions. It turns out that these numbers obey a huge num
From playlist Physique mathématique des nombres de Hurwitz pour débutants
Timothy Snyder: The Making of Modern Ukraine. Class 20. Maidan and Self-Understanding
What can be that breaking point in a person’s life? Class 20 examines the Maidan and the Self-Understanding that resulted. Guest lecturer is Marci Shore, Associate Professor of History at Yale University. Marci Shore, Ukrainian Night: An Intimate History of Revolution, New Haven: Yale Uni
From playlist Timothy Snyder: The Making of Modern Ukraine
How to determine function is a polynomial or not
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Is it a polynomial or not?
Sayan Das (Columbia) -- Law of Iterated Logarithms for the KPZ equation.
We consider the narrow wedge solution to the KPZ equation. It is well known that the one-point distribution of the KPZ equation, when centered by time/24 and scaled by time^(1/3), converges in distribution to Tracy Widom GUE distribution. Consequently, a natural thing is to ask how limsup
From playlist Northeastern Probability Seminar 2020
Given a table of values, learn how to identify the degree and LC
👉 Learn how to classify polynomials based on the number of terms as well as the leading coefficient and the degree. When we are classifying polynomials by the number of terms we will focus on monomials, binomials, and trinomials, whereas classifying polynomials by the degree will focus on
From playlist Classify Polynomials
On the symmetries of and equivalence test for design polynomials by Nikhil Gupta
Discussion Meeting Workshop on Algebraic Complexity Theory  ORGANIZERS Prahladh Harsha, Ramprasad Saptharishi and Srikanth Srinivasan DATE & TIME 25 March 2019 to 29 March 2019 VENUE Madhava Lecture Hall, ICTS Bangalore Algebraic complexity aims at understanding the computationa
From playlist Workshop on Algebraic Complexity Theory 2019
Superpolynomial Lower Bounds Against Low-Depth Algebraic Circuits I... - Srikanth Srinivasan
Computer Science/Discrete Mathematics Seminar I Topic: Superpolynomial Lower Bounds Against Low-Depth Algebraic Circuits I : An overview Speaker: Srikanth Srinivasan Affiliation: Aarhus University Date: September 27, 2021 Every multivariate polynomial P(x_1,...,x_n) can be written as a
From playlist Mathematics
Linear Algebra 2i: Polynomials Are Vectors, Too!
https://bit.ly/PavelPatreon https://lem.ma/LA - Linear Algebra on Lemma http://bit.ly/ITCYTNew - Dr. Grinfeld's Tensor Calculus textbook https://lem.ma/prep - Complete SAT Math Prep
From playlist Part 1 Linear Algebra: An In-Depth Introduction with a Focus on Applications
Maxim Kazarian - 3/3 Mathematical Physics of Hurwitz numbers
Hurwitz numbers enumerate ramified coverings of a sphere. Equivalently, they can be expressed in terms of combinatorics of the symmetric group; they enumerate factorizations of permutations as products of transpositions. It turns out that these numbers obey a huge num
From playlist Physique mathématique des nombres de Hurwitz pour débutants