Game theory Flashcards
Which players gains are shown on a payoff matrix
the player on the left / the vertical part
There is stable solution if…
the maximum value of the row of minima is the same as the minimum value of the column of maxima
playsafe strategy for horizontal player/ player 1
The maximum value of the column of row minima
playsafe strategy for vertical player/ player 2
the minimum value of the row of column maxima
maximum outcomes when finding playsafe
The maximum outcomes of each column
minimum outcomes when finding playsafe
The minimum outcomes of each row
Dominance argument for vertical player/ player 1
If the outcomes of row R are always smaller than the outcomes of row P then P dominates R
Dominance argument for horizontal player/ player 2
If the outcomes of column R are always smaller than the outcomes of column P then R dominates P
Finding the optimal mixed strategy for 2x2 payoff matrix
- assign probabilities p and 1-p to the two options for player 1
- find expressions in terms of p for As payoff under each of Bs options
- Equate these two expressions to find p
- work out the value of the game for this value of p
- repeat for player B
player 1
The vertical player, the game is from their perspective
value of the game
the payoff from the strategies used
zero sum
one persons gains = net losses of other components
optimal mixed strategy 2xn matrix
- check for dominance if there is then just do 2x2 method
- otherwise assign probabilities p and 1-p to player 1s strategies
- find expressions in terms of p for As expected payoff under each of Bs options
- plot each of these expressions between 0 and 1 and shade the region under all the lines
- find the value of p at the highest point of the shaded area
- calculate the expected payoff for this value of p
- repeat for player B
optimal mixed strategy for nx2 payoff matrix
reflect the matrix in the leading diagonal and swap the signs then follow the 2xn method
Finding the nash equilibrium
- circle the best choice for each player when the other player plays each of their strategies
- if there is a box which has two circles then that is the nash equilibrium
do all games have a nash equilibrium
no
weak dominance
if two of the strategies give an equal value
non strict nash equilibrium occurs when…
there is weak dominance
formulating a game as an LP problem
positive (and non zero) by adding a constant to each value
- let the new value of this matrix = v, objective function maximise P = v- constant
- let p, q r equal the probability player 1 chooses each strategy
- find expressions in terms of p, q, r for As payoff under each of Bs options, these are the conditions (all ≤)
- solve using simplex
objective function from a game theory problem
P = v - constant used to make the whole game positive
if you need to solve game theory with LP from other perspective then
reflect matrix in leading diagonal
swap all the signs
finding the LP conditions from a game theory problem
- let p, q r equal the probability player 1 chooses each strategy
- find expressions in terms of p, q, r for As payoff under each of Bs options, these are the conditions (all v ≤)
LP conditions from game theory
v ≤ ap + bq + cr
what time of LP problem is a game theory problem
maximise
