Add to ORKGExpected value theory has been known for centuries to be subject to critique by St. Petersburg paradox arguments. And there is a traditional rebuttal of the critique that denies the empirical relevance of the paradox because of its apparent dependence on existence of credible offers to pay unbounded sums of money. Neither critique nor rebuttal focus on the question with empirical relevance: Do people make choices in bounded St. Petersburg games that are consistent with expected value theory? This paper reports an experiment that addresses that question
We find that in cumulative prospect theory (CPT) with a concave value function in gains, a lottery w...
Abstract. The paradox of the St. Petersburg game is one of the oldest classical problems in probabil...
The Cumulative Prospect Theory, as it was specified by Tversky and Kahneman (1992) does not explain ...
Expected value theory has been known for centuries to be subject to critique by St. Petersburg parad...
The St.~Petersburg Paradox is a famous economic and philosophical puzzle that has generated numerous...
The St. Petersburg is one of the oldest violations of expected utility theory. Thus far, explanation...
It has been accepted for over 270 years that the expected monetary value (EMV)of the St Petersburg g...
The St. Petersburg paradox refers to a gamble of infinite expected value, where people are likely to...
Nicolas Bernoulli suggested the St Petersburg game, nearly 300 years ago, which is widely believed t...
pre-printIn spite of its infinite expectation value, the St. Petersburg game is not only a gamble wi...
Nover and Hájek (2004) suggested a variant of the St Petersburg game which they dubbed the Pasadena ...
Reduction of compound lotteries is implicit both in the statement of the St. Petersburg Paradox and ...
Summary.: Informal evidence suggests that individuals are willing to pay only a finite and, typicall...
This paper proposes a new decision theory of how individuals make random errors when they compute th...
Abstract The St. Petersburg paradox is one of the oldest challenges of expected value theory. Thus f...
We find that in cumulative prospect theory (CPT) with a concave value function in gains, a lottery w...
Abstract. The paradox of the St. Petersburg game is one of the oldest classical problems in probabil...
The Cumulative Prospect Theory, as it was specified by Tversky and Kahneman (1992) does not explain ...
Expected value theory has been known for centuries to be subject to critique by St. Petersburg parad...
The St.~Petersburg Paradox is a famous economic and philosophical puzzle that has generated numerous...
The St. Petersburg is one of the oldest violations of expected utility theory. Thus far, explanation...
It has been accepted for over 270 years that the expected monetary value (EMV)of the St Petersburg g...
The St. Petersburg paradox refers to a gamble of infinite expected value, where people are likely to...
Nicolas Bernoulli suggested the St Petersburg game, nearly 300 years ago, which is widely believed t...
pre-printIn spite of its infinite expectation value, the St. Petersburg game is not only a gamble wi...
Nover and Hájek (2004) suggested a variant of the St Petersburg game which they dubbed the Pasadena ...
Reduction of compound lotteries is implicit both in the statement of the St. Petersburg Paradox and ...
Summary.: Informal evidence suggests that individuals are willing to pay only a finite and, typicall...
This paper proposes a new decision theory of how individuals make random errors when they compute th...
Abstract The St. Petersburg paradox is one of the oldest challenges of expected value theory. Thus f...
We find that in cumulative prospect theory (CPT) with a concave value function in gains, a lottery w...
Abstract. The paradox of the St. Petersburg game is one of the oldest classical problems in probabil...
The Cumulative Prospect Theory, as it was specified by Tversky and Kahneman (1992) does not explain ...