1. Evolutionary Stability and Pareto Ranked Equilibria (30 points) Consider the following symmetric two-player game. Each player can 'demand' an amount 1, 2 or 3. If both players demand the same amount then they each get that amount. If they demand different amounts then the player who demands less gets the amount demanded by the player who de- manded more, and the player who demands more gets 1/4 of her demand. That is, if 81 82 if $1 = 82 if 81 2 82 (a) (10 points) Draw the normal form matrix for this game and find all the symmetric pure-strategy Nash Equilibria. Are they Pareto ranked? (b) (10 points) Which pure strategies are evolutionary stable against pure-strategy mutant invasions? (c) (5 points) How would your answer to part (b) change if a possible demand of 0 were added to the other three strategies (keeping the same payoff rule)? (d) (5 points) How would your answer to part (b) change if the payoff un (s1, s2) when $1 > s, was changed to 4 (otherwise keeping the payoff rule the same)