bookmate game
en
Bücher
Ivan Pastine

Introducing Game Theory: A Graphic Guide (Introducing…)

When should you adopt an aggressive business strategy? How do we make decisions when we don't have all the information? What makes international environmental cooperation possible?
Game theory is the study of how we make a decision when the outcome of our moves depends on the decisions of someone else. Economists Ivan and Tuvana Pastine explain why, in these situations, we sometimes cooperate, sometimes clash, and sometimes act in a way that seems completely random.
Stylishly brought to life by award-winning cartoonist Tom Humberstone, Game Theory will help readers understand behaviour in everything from our social lives to business, global politics to evolutionary biology. It provides a thrilling new perspective on the world we live in.
273 Druckseiten
Copyright-Inhaber
Bookwire
Ursprüngliche Veröffentlichung
2017
Jahr der Veröffentlichung
2017
Haben Sie es bereits gelesen? Was halten sie davon?
👍👎

Ersteindruck

  • Дмитрийhat einen Ersteindruck geteiltvor 4 Jahren
    👍Lesenswert
    🔮Unerwarteter Tiefgang
    💡Viel gelernt
    🚀Unweglegbar

    Cool stuff

  • Александр Лубневскийhat einen Ersteindruck geteiltvor 5 Jahren
    👍Lesenswert
    💡Viel gelernt

Zitate

  • Shin Loon Leehat Zitat gemachtvor 3 Jahren
    Models are simple enough to analyze but still capture some important feature of the real-world problem. A cleverly chosen simple model can help us learn something useful about the complex real-world problem.
  • Henrik Ulrik Anker Hansenhat Zitat gemachtvor 5 Jahren
    Game theorists solve the Guessing Game in a similar fashion using iterative elimination of dominated strategies.
    Remember that you’re looking for 2/3 of the average number entered into the contest. If all contestants were to pick the highest permissible number, 100, the average would be 100. Hence, no matter what one expects the average to be, it makes no sense to ever guess a number greater than 2/3 of 100, which is 67.
    In other words, any strategy with a guess greater than 67 is dominated by 67. A strategy is dominated if it (in this case, a guess higher than 67) is worse than another strategy (guessing 67) regardless of what other players do. Hence, even if no one else is rational, all strategies with a guess greater than 67 can be eliminated.
  • mishunguyen191005hat Zitat gemachtletztes Jahr
    vidual benefits at the expense of others.

In Regalen

fb2epub
Ziehen Sie Ihre Dateien herüber (nicht mehr als fünf auf einmal)