Abstract
Gott (1993) has used the ‘Copernican principle’ to derive a probability distribution for the total longevity of any phenomenon, based solely on the phenomenon's past longevity. Leslie (1996) and others have used an apparently similar probabilistic argument, the ‘Doomsday Argument’, to claim that conventional predictions of longevity must be adjusted, based on Bayes's Theorem, in favor of shorter longevities. Here I show that Gott's arguments are flawed and contradictory, but that one of his conclusions is plausible and mathematically equivalent to Laplace's famous—and notorious—‘rule of succession’. On the other hand, the Doomsday Argument, though it appears consistent with some common-sense grains of truth, is fallacious; the argument's key error is to conflate future longevity and total longevity. Applying the work of Hill (1968) and Coolen (1998, 2006) in the field of nonparametric predictive inference, I propose an alternative argument for quantifying how past longevity of a phenomenon does provide evidence for future longevity. In so doing, I identify an objective standard by which to choose among counting time intervals, counting population, or counting any other measure of past longevity in predicting future longevity.
Publisher
Cambridge University Press (CUP)
Subject
History and Philosophy of Science,Philosophy,History
Reference32 articles.
1. Sorting Out the Anti-Doomsday Arguments: A Reply to Sowers;Adams;Sorting Out the Anti-Doomsday Arguments: A Reply to Sowers,2007
2. On the Theory of Errors and Least Squares;Jeffreys;On the Theory of Errors and Least Squares,1932
3. How to Predict Future Duration from Present Age;Monton;How to Predict Future Duration from Present Age,2006
4. Posterior Distribution of Percentiles: Bayes’ Theorem for Sampling from a Population;Hill;Posterior Distribution of Percentiles: Bayes’ Theorem for Sampling from a Population,1968
Cited by
8 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献