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Signalling. Experiment game. We ran an experiment on what is called the Beer-Quiche Game (Cho & Kreps, 1987). Proposer has 2/3 chance of being strong. He can eat Beer or Quiche. Strong types like Beer. Weak types like Quiche.
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Experiment game • We ran an experiment on what is called the Beer-Quiche Game (Cho & Kreps, 1987). • Proposer has 2/3 chance of being strong. • He can eat Beer or Quiche. • Strong types like Beer. Weak types like Quiche. • Responder can fight or flee. Responders don’t want to fight a strong type.
Signalling in the Lab:Treatment 1 • For a strong proposer,(Beer, flee)>(Beer, fight)>(Quiche, flee)>(Quiche, fight). • For a weak proposer,(Quiche, flee)>(Quiche, fight)>(Beer, flee)>(Beer, fight). • Strong chooses Beer and Weak chooses Quiche
Signalling in the Lab:Treatment 1 • Responder now knows that Beer is the choice of the strong type and Quiche is the choice of the weak type. • For Beer he flees, for Quiche he fights.
Signalling in the Lab:Treatment 1 • So the equilibrium is • For strong, (Beer, Flee) • For weak, (Quiche, Fight) • This is called a separating equilibrium. • Any incentive to deviate?
Signalling in the Lab:Treatment 1 32 13 What did you do? In the last 5 rounds, there were 32 Strong and 13 Weak proposers
Treatment 2. • Can we have a separating equilibrium here?. • If the proposer is weak, he can choose Beer and get $1.00 instead of $0.60.
Treatment 2. • Can choosing Beer independent of being strong or weak be an equilibrium? • Yes! The responder knows there is a 2/3 chance of being strong, thus flees. • This is called a pooling equilibrium.
Treatment 2. 4 30 3 8 • Did we have a pooling equilibrium? • In the last 5 rounds there were 34 strong proposers and 11 weak proposers. • Do you think there is somewhat to help the pooling equilibrium to form?
Treatment 2. 23 14 3 • At Texas A&M, the aggregate numbers were shown. • In the last 5 periods, 23 proposers were strong and 17 weak.
Signalling game • Spence got the Nobel prize in 2001 for this. • There are two players: A and B. Player A is either strong or weak. • Player B will chose one action (flee) if he knows player A is strong • and another action (fight) if he knows player A is weak. • Player A can send a costly signal to Player B (in this case it was to drink beer).
Signal • For signalling to have meaning, • we must have either cost of the signal higher for the weak type. • Or the gain from the action higher for the strong type.
Types of equilibria • Separating. • Strong signal • Weak don’t signal. • Pooling. • Strong and weak both send the signal. • (or Strong and weak both don’t send the signal.)
Types of equilibria • Player A is the proposer and B the responder. • The types of player A are s and w. • Let us normalize the value to A when B fights to 0. • The values to A when B flees are Vs and Vw. • The cost to signalling (drinking beer) are Cs and Cw. • We get a separating equilibria if Vs-Cs>0 and Vw-Cw<0. • We get a pooling equilibria if Vs-Cs<0 and Vw-Cw<0 (no one signals). • We may also get a pooling equilibria if Vs-Cs>0 and Vw-Cw>0 and there are enough s types. • For this to happen, there must be enough s types such that the expected payoff of B is higher fleeing than fighting.
Treatment 2: Other pooling?. • How about both proposers eat quiche and the responder flees? Is this an equilibrium? • If responders think anyone who drinks Beer must be weak. • Cho-Kreps introduce an “intuitive criteria” that says this does not make sense. • Any proposer drinking Beer must be strong, because the weak type can only lose from doing so.
Gift giving • Gift giving can be wasteful. (Why not give $$$?) • Basically, you get someone a gift to signal your intent. • American Indian tribes, a ceremony to initiate relations with another tribe included the burning of the tribe’s most valuable possession,
Courtship gifts. • Dating Advice. • Advice 1: never take such advice from an economist. • Advice 2.: • Say that there is someone that is a perfect match for you. You know this, they just haven’t figured it out yet. • Offer to take them to a really expensive place. • It would only make sense for you to do this, if you knew that you would get a relationship out of it. • That person should then agree to go.
Valentine’s Day • Who bought a card, chocolate, etc? • We are forced to spend in order to signal that we “really” care. • Say that you are either serious or not serious about your relationship. • If your partner knew you were not serious, he or she would break up with you. • A card is pretty inexpensive, so both types buy it to keep the relationship going. • Your partner keeps the relationship since there is a real chance you are serious. • No real information is gained, but if you didn’t buy the card, your partner would assume that you are not serious and break up with you.
Higher value and/or Lower Cost Higher value • You buy someone a gift to signal that you care. • Sending a costly signal means that they mean a lot to you. • For someone that doesn’t mean so much, you wouldn’t buy them such a gift. Lower cost • The person knows you well. • Shopping for you costs them less. • They signal that they know you well.
Other types of signalling in the world • University Education. • Showing up to class. • Praying. Mobile phone for Orthodox Jews • Poker: Raising stakes (partial). • Peacock tails. • Limit pricing.
Homework: Simplified Poker. Assume the odds of a strong hand is 80%. Find any equilibrium. Is it signalling or pooling? Extra hard: what happens if it is 60%?
