by From Asad Zaman In my paper entitled “Empirical Evidence Against Neoclassical Utility Theory: A Survey of the Literature,” I have argued that neoclassical utility theory acts as a blindfold, which prevents economists from understanding simple realities of human behavior. The paper provides many examples of this phenomenon, which I will illustrate briefly with one simple example in this post. Consider the two player Ultimatum Game. The Proposer (P) has ten dollars in single dollar bills. He makes an offer of $m to the Responder (R), which allows him to keep $(10-m). The responder can either Accept or Reject. If Responder Accepts than P get -m, and R get $m as proposed; it is convenient to denote this outcome as (P:10-m,R:m). If Responder Rejects, then both get %excerpt%: (P:0,R:0) Here are four predictions made by Game Theory, based on utility maximization behavior. Responder will be indifferent between the two choices Accept and Reject if he is offered %excerpt%. Responder will Accept an offer of , resulting in outcome (P:9, R:1). R prefers 1 to 0. Proposer believes that Responder is a Utility Maximizer; that is, he will behave in accordance with propositions 1 & 2 above. Proposer will therefore offer , as it maximizes his share at .
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from Asad Zaman
In my paper entitled “Empirical Evidence Against Neoclassical Utility Theory: A Survey of the Literature,” I have argued that neoclassical utility theory acts as a blindfold, which prevents economists from understanding simple realities of human behavior. The paper provides many examples of this phenomenon, which I will illustrate briefly with one simple example in this post.
Consider the two player Ultimatum Game. The Proposer (P) has ten dollars in single dollar bills. He makes an offer of $m to the Responder (R), which allows him to keep $(10-m). The responder can either Accept or Reject. If Responder Accepts than P get $10-m, and R get $m as proposed; it is convenient to denote this outcome as (P:10-m,R:m). If Responder Rejects, then both get $0: (P:0,R:0)
Here are four predictions made by Game Theory, based on utility maximization behavior.
- Responder will be indifferent between the two choices Accept and Reject if he is offered $0.
- Responder will Accept an offer of $1, resulting in outcome (P:9, R:1). R prefers 1 to 0.
- Proposer believes that Responder is a Utility Maximizer; that is, he will behave in accordance with propositions 1 & 2 above.
- Proposer will therefore offer $1, as it maximizes his share at $9. If he offers $0, the outcome is uncertain because both responses A and R are possible maximizing responses, which is why an offer of $1 is the unique utility maximizing offer.
All four of these propositions are false. Furthermore, every layman will . . . read more