5. Combining simultaneous and sequential moves. In this section we shall learn How the tools used to analyze sequential games can be used on simultaneous games and vice versa. How to understand games that involve both sequential and simultaneous moves. How a switch from simultaneous to sequential (or vice versa) moves may be used by a player to gain an advantage. Games People Play.
Combining simultaneous and sequential moves. Many games involve both simultaneous and sequential moves. The use of game trees (extensive form) and payoff matrices (strategic form) are interchangeable. Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. From extensive form to strategic form Recall the senate race game. The key to converting this from extensive to sequential form is to recognize that Gary has two types of strategy. Simply play in or out. Play a contingent strategy. For example; If Arnold plays ads I play out. Gary Arnie Ads No ads In Out 1 , 1 3 , 3 2 , 4 4 , 2 , Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. From extensive form to strategic form Strategies. {In, In} - always enter. {In, Out} – enter if ads, don’t enter otherwise. {Out, In} – enter if no ads, don’t enter otherwise. {Out, Out} – Never enter. Gary Arnie Ads No ads In Out 1 , 1 3 , 3 2 , 4 4 , 2 , Gary In, In In, Out Out, In Out, Out Arnie Ads 1,1 3,3 No ads 2,4 4,2 Games People Play.
Combining simultaneous and sequential moves From strategic form to extensive form To convert from strategic to extensive form representation requires the use of information sets. Consider the chicken game Player #2 Straight Swerve Player #1 -2,-2 1,-1 -1,1 0,0 Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. From strategic form to extensive form. Player #1 Straight Swerve Player #2 Payoffs #1 , #2 -2 ,-2 1 ,-1 -1 ,1 ,0 Information set Player #2 Straight Swerve Player #1 -2,-2 1,-1 -1,1 0,0 Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Product development and pricing game. Consider a game in which two firms are deciding on their future product lines. Each must first choose whether to develop and produce one of two similar goods, a fancy expensive to manufacture high-tech model, or a cheaply produced low-tech version. Their decisions are unknown to each other up until the point the new models are unveiled. Once the models are unveiled each must then choose a pricing strategy. For simplicity they may choose a high or low priced for each model. Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Product development and pricing game. Game tree. High-Tech Low-Tech P H L Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Product development and pricing game. The players first play a simultaneous product development game. They then play simultaneously play the pricing game. But – the two games occur sequentially and thus the solution requires the use of backwards induction. Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Rules Change. Switching from a sequential move to a simultaneous move game. Sometimes this switch can be used as a strategy. Consider the senate race game as in simultaneous form. Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Senate race game in simultaneous form. We see that no ads is a dominant strategy for Arnold. Hence Gary chooses in. In the sequential version Arnold chose ads and Gary stayed out. Gary In Out Arnold Ads 1,1 3,3 No ads 2,4 4,2 Games People Play.
Combining simultaneous and sequential moves Combining simultaneous and sequential moves. Games with both sequential and simultaneous moves. Subgame perfection. Suppose that gateway could commit to playing Foreign. The equilibrium would be {U,U,F}. But the commitment is not credible. Where the U, U node to be reached Gateway would play U. At each node the players will maximize. The continuations of the game from each node must be equilibria. This implies that the subgame perfect equilibrium is {F,U,U}. Dell HP Gateway US Foreign Payoffs 1, 5 , 5, 2 3, 4 2, 4, 3 Games People Play.