Ort, Marianne

Lade...
Profilbild
E-Mail-Adresse
Geburtsdatum
Projekt
Organisationseinheiten
Berufsbeschreibung
Nachname
Ort
Vorname
Marianne
Name
Ort, Marianne

Suchergebnisse

Gerade angezeigt 1 - 2 von 2
Lade...
Vorschaubild
Publikation

Contribution discussing the negotiations concerning Greece dept problem using game theory

2015, Ort, Marianne

To discuss the negotiation between the creditors (European central bank, IMF International Monetary Fund, Euro Group; without private investors) and Greece (the Greek Government) a game theoretical approach is used. The discussed question is: shall they opt for Grexit (Greece is leaving the euro zone) or for NotGrexit (Greece remains in the euro zone). First we will see that under some circumstances a mixed strategy for Greece is possible (i. e. the player will choose a strategy with some probability) Mixed strategies can help to escape a deadlock situation. That means switching for example from a second best payoff for both to a better payoff for both. But we will see that this possibility is useless. In most cases the payoffs leads for Greece to the option Grexit. Only in one scenario which is close to the Prisoner’s Dilemma the option NotGrexit for both could be possible. But this situation would need a lot of trusting discussions and transparent information about the strategy of each player.

Lade...
Vorschaubild
Publikation

Contribution solving interdisciplinary problems using mathematical methods

2014, Ort, Marianne

Prisoner's Dilemma is fomulated for repeated games. In the Excel Sheet you will find a Szenario for the example Tit-For-Tat, i.e. a player A1 uses strategy Tit-For-Tat, player A2 cooperates at each step with probability you wish to put on. This probability will be exercised using scenario. You will find the strategies in each step for the two players, the payoffs per step and cumulative for each player and the sum of the cumulative payoff for both. The second example uses a demographical context, i.e. the strategies in each step for the two players, the payoffs per step, fund for each player and the sum for both are shown. Furthermore the ratio replaced players depended on their initial strategy are calculated.