Generalized game theory is an extension of game theory incorporating social theory concepts such as norm, value, belief, role, social relationship, and institution. The theory was developed by Tom R. Burns, Anna Gomolinska, and Ewa Roszkowska but has not had great influence beyond these immediate associates. The theory seeks to address certain perceived limitations of game theory by formulating a theory of rules and rule complexes and to develop a more robust approach to socio-psychological and sociological phenomena. (Wikipedia).
Jules Hedges - compositional game theory - part I
Compositional game theory is an approach to game theory that is designed to have better mathematical (loosely “algebraic” and “geometric”) properties, while also being intended as a practical setting for microeconomic modelling. It gives a graphical representation of games in which the flo
From playlist compositional game theory
Jules Hedges - compositional game theory - part III
Compositional game theory is an approach to game theory that is designed to have better mathematical (loosely “algebraic” and “geometric”) properties, while also being intended as a practical setting for microeconomic modelling. It gives a graphical representation of games in which the flo
From playlist compositional game theory
Jules Hedges - compositional game theory - part IV
Compositional game theory is an approach to game theory that is designed to have better mathematical (loosely “algebraic” and “geometric”) properties, while also being intended as a practical setting for microeconomic modelling. It gives a graphical representation of games in which the flo
From playlist compositional game theory
Number theory Full Course [A to Z]
Number theory (or arithmetic or higher arithmetic in older usage) is a branch of pure #mathematics devoted primarily to the study of the integers and integer-valued functions. Number theorists study prime numbers as well as the properties of objects made out of integers (for example, ratio
From playlist Number Theory
Why Game Theory is Not About Competition
This video was made possible by our Patreon community! ❤️ See new videos early, participate in exclusive Q&As, and more! ➡️ https://www.patreon.com/EconomicsExplained ▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀▀ Game Theory is supposed to show how businesses (and prisoners) can outdo each other to win out
From playlist Case Studies
Mod-03 Lec-13 Cournot Model of Oligopoly
Game Theory and Economics by Dr. Debarshi Das, Department of Humanities and Social Sciences, IIT Guwahati. For more details on NPTEL visit http://nptel.iitm.ac.in
From playlist IIT Guwahati: Game Theory and Economics | CosmoLearning.org Economics
This video contains the origins of group theory, the formal definition, and theoretical and real-world examples for those beginning in group theory or wanting a refresher :)
From playlist Summer of Math Exposition Youtube Videos
Nash Equilibriums // How to use Game Theory to render your opponents indifferent
Check out Brilliant ► https://brilliant.org/TreforBazett/ Join for free and the first 200 subscribers get 20% off an annual premium subscription. Thank you to Brilliant for sponsoring this playlist on Game Theory. Game Theory Playlist ► https://www.youtube.com/playlist?list=PLHXZ9OQGMqx
From playlist Game Theory
This lecture is part of an online course on Galois theory. This is an introductory lecture, giving an informal overview of Galois theory. We discuss some historical examples of problems that it was used to solve, such as the Abel-Ruffini theorem that degree 5 polynomials cannot in genera
From playlist Galois theory
Peter Caines: "Graphon MFGs: A Dynamical Equilibrium Theory for Large Populations on Large Scale..."
High Dimensional Hamilton-Jacobi PDEs 2020 Workshop III: Mean Field Games and Applications "Graphon Mean Field Games: A Dynamical Equilibrium Theory for Large Populations on Large Scale Networks" Peter Caines - McGill University Abstract: Very large scale (finite) networks (VLSNs) linkin
From playlist High Dimensional Hamilton-Jacobi PDEs 2020
Peter E. Caines: Graphon Mean Field Games and the GMFG Equations
Very large networks linking dynamical agents are now ubiquitous and there is significant interest in their analysis, design and control. The emergence of the graphon theory of large networks and their infinite limits has recently enabled the formulation of a theory of the centralized contr
From playlist Probability and Statistics
David McAllester - Dependent Type Theory from the Perspective of Mathematics, Physics, and (...)
Dependent type theory imposes a type system on Zemelo-Fraenkel set theory (ZFC). From a mathematics and physics perspective dependent type theory naturally generalizes the Bourbaki notion of structure and provides a universal notion of isomorphism and symmetry. This comes with a universal
From playlist Mikefest: A conference in honor of Michael Douglas' 60th birthday
Modified Navier–Stokes and Decision Process Theory
As a next step in investigating decision process theory, Jerry Thomas considers steady-state non-streamline solutions to a 3D model. The equations are modified Navier–Stokes equations. Using NDSolve, he shows that these steady-state solutions are not dissimilar to fluid flow solutions desp
From playlist Wolfram Technology Conference 2020
Levon Nurbekyan: "Computational methods for mean-field games (Part 1/2)"
Watch part 2/2 here: https://youtu.be/QhGFzKGpRPA High Dimensional Hamilton-Jacobi PDEs Tutorials 2020 "Computational methods for mean-field games (Part 1/2)" Levon Nurbekyan - University of California, Los Angeles Abstract: I will give an overview of computational methods for mean-fiel
From playlist High Dimensional Hamilton-Jacobi PDEs 2020
Nevanlinna Prize Lecture: Equilibria and fixed points — Constantinos Daskalakis — ICM2018
Equilibria, fixed points, and computational complexity Constantinos Daskalakis Abstract: The concept of equilibrium, in its various forms, has played a central role in the development of Game Theory and Economics. The mathematical properties and computational complexity of equilibria are
From playlist Special / Prizes Lectures
5f Machine Learning: Non-cooperative Game Theory
A lecture on non-cooperative game theory including a basic introduction up to pure and mixed strategy Nash equilibrium and applications. I was motivated by the recent use of Shapley value from cooperative game theory for machine learning model explainability.
From playlist Machine Learning
06 - Pedagogical Models & Player Types
Introductory planning discussion, as well as pedagogical models and player types
From playlist 2021 - IMT4307 - Serious Games
IMT4307 - Serious Games (Education)
Education background, Learning Styles, Paper discussion
From playlist Archive - Serious Games
Mod-05 Lec-36 Subgame Perfect Nash Equilibrium
Game Theory and Economics by Dr. Debarshi Das, Department of Humanities and Social Sciences, IIT Guwahati. For more details on NPTEL visit http://nptel.iitm.ac.in
From playlist IIT Guwahati: Game Theory and Economics | CosmoLearning.org Economics
Cohesive Games and Lessons Learned from the Field Theory of Games
Based on teaching the Field Theory of Games to upper-class students, there were interesting lessons learned. For example, it is possible in a short time to educate them to use the Wolfram Language sufficiently to apply the field theory of games to problems of interest to them. It is possib
From playlist Wolfram Technology Conference 2022