Example
A horde of zombies is attacking the village where Anna and Ben live. They could either Help or Leave.
Ben | |||
---|---|---|---|
Anna |
Help | Leave | |
Help | 3, 2 | 0, 0 | |
Leave | 0, 0 | 2, 1 |
Anna's mixed strategy
Anna chooses to Help with probability `p` that makes Ben indifferent between Helping and Leaving.
$$ \begin{align*} E(Help) &= E(Leave) \\ 2 p + 0 (1 - p) &= 0p + 1(1-p) \\ 2p &= 1 - p \\ 3p = 1 \\ p = \frac{1}{3} \end{align*} $$Ben's mixed strategy
Ben chooses to Help with probability `q` that makes Anna indifferent between Helping and Leaving.
$$ \begin{align*} E(Help) &= E(Leave) \\ 3 q + 0 (1 - q) &= 0q + 2(1-q) \\ 3q &= 2 - 2q \\ 5q = 2 \\ q = \frac{2}{5} \end{align*} $$Conclusion
In equilibrium:
- Anna Helps with probability `\frac{1}{3}` and Leaves with probability `\frac{2}{3}`.
- Ben Helps with probability `\frac{2}{5}` and Leaves with probability `\frac{3}{5}`.
Question
Consider the following payoff matrix:
Ben | |||
---|---|---|---|
Anna |
Help | Leave | |
Help | 7, 8 | -7, -8 | |
Leave | -6, 4 | -3, 7 |
What is the Mixed Strategy Nash Equilibrium.
Anna Helps with probability `3 / 19`. Ben Helps with probability `3 / 17`.
Anna's mixed strategy
Anna Helps with probability `p` so that Ben is indifferent between Helping and Leaving:
$$ \begin{align*} 8 \times p + 4 \times (1 - p) &= -8 \times p + 7 \times (1 - p) \\ 4 p + 4 &= -15 p + 7 \\ 19 p &= 3 \\ p &= \frac{3}{19} \end{align*} $$
Ben's mixed strategy
Ben Helps with probability `q` so that Anna is indifferent between Helping and Leaving:
$$ \begin{align*} 7 \times q -6 \times (1 - q) &= -7 \times q -3 \times (1 - q) \\ 13 q -6 &= -4 q -3 \\ 17 q &= 3 \\ q &= \frac{3}{17} \end{align*} $$Conclusion
In equilibrium:
- Anna Helps with probability `3 / 19` and Leaves with probability `16 / 19`.
- Ben Helps with probability `3 / 17` and Leaves with probability `14 / 17`.