In mechanism design, monotonicity is a property of a social choice function. It is a necessary condition for being able to implement the function using a strategyproof mechanism. Its verbal description is: If changing one agent's type (while keeping the types of other agents fixed) changes the outcome under the social choice function, then the resulting difference in utilities of the new and original outcomes evaluated at the new type of this agent must be at least as much as this difference in utilities evaluated at the original type of this agent. In other words: If the social choice changes when a single player changes his valuation, then it must be because the player increased his value of the new choice relative to his value of the old choice. (Wikipedia).
Learn to factor a monomial to it's linear factors
👉 Learn how to factor a number, variable, and monomial completely. To factor means to write our term as a product of its factors. Therefore we will learn how to break down a number, variable, and monomial into its factors. 👏SUBSCRIBE to my channel here: https://www.youtube.com/user/mrb
From playlist Prime Factorization
How to Multiply a Monomial by a Trinomial Using Distributive Property
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
How to Multiply a Monomial by a Trinomial Polynomial Product
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
Multiply a Monomial by a Trinomial - Free Math Help Videos
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
Using the Box Method to Multiply a Monomial by a Trinomial
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
How to Multiply Two Monomials by a Trinomial and Binomial
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
Overview and Recent Results in Combinatorial Auctions - Matt Weinberg
Computer Science/Discrete Mathematics Seminar II Topic: Overview and Recent Results in Combinatorial Auctions Speaker: Matt Weinberg Affiliation: Princeton University Date: February 7, 2023 In this talk, I'll first give a broad overview of the history of combinatorial auctions within TCS
From playlist Mathematics
Rico Zenklusen: The Submodular Secretary Problem Goes Linear
During the last decade, the matroid secretary problem (MSP) became one of the most prominent classes of online selection problems. The strong interest in MSPs is due to both its many applications and the fact that matroid constraints have useful properties for the design of strong online a
From playlist HIM Lectures 2015
Hardness of Randomized Truthful Mechanisms for Combinatorial Auctions - Jan Vondrak
Jan Vondrak IBM Almaden March 26, 2012 The problem of combinatorial auctions is one of the basic questions in algorithmic mechanism design: how can we allocate/sell m items to n agents with private valuations of different combinations of items, so that the agents are motivated to reveal th
From playlist Mathematics
Model-Based Design for Predictive Maintenance, Part 5: Development of a Predictive Model
See the full playlist: https://www.youtube.com/playlist?list=PLn8PRpmsu08qe_LVgUHtDrSXiNz6XFcS0 After performing real-time tests and validating your algorithm, you can use it to detect whether there are any mechanical or electrical issues in your system. However, you can also use condition
From playlist Model-Based Design for Predictive Maintenance
Multiply a Monomial by a Polynomial Using Distributive Property
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
How to factor a monomial to it's linear factors
👉 Learn how to factor a number, variable, and monomial completely. To factor means to write our term as a product of its factors. Therefore we will learn how to break down a number, variable, and monomial into its factors. 👏SUBSCRIBE to my channel here: https://www.youtube.com/user/mrb
From playlist Prime Factorization
Wicked Good Ruby 2013 - Bloom: A Language for Disorderly Distributed Programming
By Christopher Meiklejohn Traditional programming languages use a model of computation where individual instructions are executed in order. However, when building distributed systems this model fails to match the reality of how your application code is actually executed. Bloom is a langua
From playlist Wicked Good Ruby 2013
Max Jensen: Convergent semi-Lagrangian methods for the Monge-Ampère equation on unstructured grids
The lecture was held within the framework of the Hausdorff Trimester Program Multiscale Problems: Workshop on Numerical Inverse and Stochastic Homogenization. (15.02.2017) In this presentation I will discuss a semi-Lagrangian discretisation of the Monge-Ampère operator on P1 finite elemen
From playlist HIM Lectures: Trimester Program "Multiscale Problems"
Memory Retention in disordered bio-polymer networks by Sayantan Majumdar
PROGRAM ENTROPY, INFORMATION AND ORDER IN SOFT MATTER ORGANIZERS: Bulbul Chakraborty, Pinaki Chaudhuri, Chandan Dasgupta, Marjolein Dijkstra, Smarajit Karmakar, Vijaykumar Krishnamurthy, Jorge Kurchan, Madan Rao, Srikanth Sastry and Francesco Sciortino DATE: 27 August 2018 to 02 Novemb
From playlist Entropy, Information and Order in Soft Matter
Moshe Goldstein: "Correlation induced band competition in oxide interfaces: (001) vs. (111) LAO/STO"
Theory and Computation for 2D Materials "Correlation induced band competition in oxide interfaces: (001) vs. (111) LAO/STO" Moshe Goldstein, Tel Aviv University Abstract: The interface between the two insulating oxides SrTiO3 and LaAlO3 gives rise to a two-dimensional electron system wit
From playlist Theory and Computation for 2D Materials 2020
How to Use the Distributive Property with a Trinomial
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials
Let’s Create a Speech Synthesizer (C++17) with Finnish Accent!
In this tool-assisted education video, we create a speech synthesizer in modern C++ — with a Finnish accent. The video deconstructs speech and phonemes and explores the Linear Predictive Coding, LPC. The open source programs Praat and Audacity are featured. All downloadable materials, inc
From playlist Let’s Create a Speech Synthesizer
Uncoupled isotonic regression - Jonathan Niles-Weed
More videos on http://video.ias.edu
From playlist Mathematics
Learn How to Easily Multiply a Monomial by a Trinomial
👉 Learn how to multiply polynomials. We apply the distributive property to polynomials by multiplying a monomial to every term in a polynomial. When multiplying monomials it is important that we multiply the coefficients and apply the rules of exponents to add the powers of each variable.
From playlist How to Multiply Polynomials