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Talk
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Summer Undergrad 2020 - Numerical Methods (A) - Lecture 5
Aaron Szasz Alphabet (United States)
PIRSA:20060013 -
Summer Undergrad 2020 - Numerical Methods (A) - Lecture 4
Aaron Szasz Alphabet (United States)
PIRSA:20060012 -
Summer Undergrad 2020 - Numerical Methods (A) - Lecture 3
Aaron Szasz Alphabet (United States)
PIRSA:20060011 -
Summer Undergrad 2020 - Numerical Methods (A) - Lecture 2
Aaron Szasz Alphabet (United States)
PIRSA:20050041 -
Summer Undergrad 2020 - Numerical Methods (A) - Lecture 1
Aaron Szasz Alphabet (United States)
PIRSA:20050040
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Talk
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Summer Undergrad 2020 - Quantum Information - Lecture 5
Alioscia Hamma University of Naples Federico II
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Summer Undergrad 2020 - Quantum Information - Lecture 4
Alioscia Hamma University of Naples Federico II
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Summer Undergrad 2020 - Quantum Information - Lecture 3
Alioscia Hamma University of Naples Federico II
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Summer Undergrad 2020 - Quantum Information - Lecture 2
Alioscia Hamma University of Naples Federico II
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Summer Undergrad 2020 - Quantum Information - Lecture 1
Alioscia Hamma University of Naples Federico II
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Talk
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Summer Undergrad 2020 - Path Integrals (M) - Lecture 5
Dan Wohns Perimeter Institute for Theoretical Physics
PIRSA:20060007 -
Summer Undergrad 2020 - Path Integrals (M) - Lecture 4
Dan Wohns Perimeter Institute for Theoretical Physics
PIRSA:20060006 -
Summer Undergrad 2020 - Path Integrals (M) - Lecture 3
Dan Wohns Perimeter Institute for Theoretical Physics
PIRSA:20060005 -
Summer Undergrad 2020 - Path Integrals (M) - Lecture 2
Dan Wohns Perimeter Institute for Theoretical Physics
PIRSA:20050037 -
Summer Undergrad 2020 - Path Integrals (M) - Lecture 1
Dan Wohns Perimeter Institute for Theoretical Physics
PIRSA:20050036
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Talk
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Projective elliptic genera and applications
Fei Han National University of Singapore
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Topological Modular Forms and Quantum Field Theory
Davide Gaiotto Perimeter Institute for Theoretical Physics
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Equivariant elliptic cohomology with integral coefficients
Lennart Meier Utrecht University
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The de Rham model for elliptic cohomology from physics
Arnav Tripathy Harvard University
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Quasisymmetric characteristic numbers for Hamiltonian toric manifolds
Jack Morava Johns Hopkins University
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Codes, vertex algebras and topological modular forms
Gerd Laures Ruhr University Bochum
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Elliptic characteristic classes, bow varieties, 3d mirror duality
Richard Rimanyi University of North Carolina - Chapel Hll
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Talk
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PSI 2019/2020 - Cosmology Part 2 - Lecture 2
Matthew Johnson York University
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PSI 2019/2020 - Cosmology Part 2 - Lecture 1
Matthew Johnson York University
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Summer Undergrad 2020 - Numerical Methods
This course has two main goals: (1) to introduce some key models from condensed matter physics; and (2) to introduce some numerical approaches to studying these (and other) models. As a precursor to these objectives, we will carefully understand many-body states and operators from the perspective of condensed matter theory. (However, I will cover only spin models. We will not discuss or use second quantization.)
Once this background is established, we will study the method of exact diagonalization and write simple python programs to find ground states, correlation functions, energy gaps, and other properties of the transverse-field Ising model. We will also discuss the computational limitations of exact diagonalization. Finally, I will introduce the concept of matrix product states, and we will see that these can be used to study ground state properties for much larger systems than can be studied with exact diagonalization.
Each 90-minute session will include substantial programming exercises in addition to lecture. Prior programming experience is not expected or required, but I would like everyone to have python (version 3) installed on their computer prior to the first class, including Jupyter notebooks; see “Resources” below.
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Summer Undergrad 2020 - Quantum Information
The aim of this course is to understand the thermodynamics of quantum systems and in the process to learn some fundamental tools in Quantum Information. We will focus on the topics of foundations of quantum statistical mechanics, resource theories, entanglement, fluctuation theorems, and quantum machines.
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Summer Undergrad 2020 - Path Integrals
The goal of this course is to introduce the path integral formulation of quantum mechanics and a few of its applications. We will begin by motivating the path integral formulation and explaining its connections to other formulations of quantum mechanics and its relation to classical mechanics. We will then explore some applications of path integrals. Each 90-minute session will include roughly equal amounts of lecture time and activities. The activities are designed to enhance your learning experience and allow you to assess your own level of understanding.
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Infrared Physics in Gauge and Gravity
Infrared Physics in Gauge and Gravity -
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PSI 2019/2020 - Quantum Gravity Part 2
PSI 2019/2020 - Quantum Gravity Part 2 -
PSI 2019/2020 - Quantum Information
PSI 2019/2020 - Quantum Information -
PSI 2019/2020 Relativistic Quantum Information Part 2
PSI 2019/2020 Relativistic Quantum Information Part 2 -
PIMan: The Second Perimeter Institute-Chapman Workshop on Quantum Foundations
PIMan: The Second Perimeter Institute-Chapman Workshop on Quantum Foundations -
PSI 2019/2020 - Chern-Simons Theory Part 2
PSI 2019/2020 - Chern-Simons Theory Part 2 -
PSI 2019/2020 - Cosmology Part 2
PSI 2019/2020 - Cosmology Part 2