Anthropic Bias Observation Selection Effects in Science and Philosophy Nick Bostrom

Doomsday à la Gott

Suppose we want to estimate how long some series of observations (or “measurements”) is going to last. Then,

Assuming that whatever we are measuring can be observed only in the interval between times t_begin and t_end, if there is nothing special about t_now we expect t_now to be randomly located in this interval. ((Gott 1993), p. 315)

Using this randomness assumption, we can make the estimate

Here, t_future is the estimated value of how much longer the series will last. This means that we make the estimate that the series will continue for roughly as long as it has already lasted when we make the random observation. This estimate will overestimate the true value half of the time and underestimate it half of the time. It also follows that a 50% confidence interval is given by

and a 95% confidence interval is given by

Gott gives some illustrations of how this reasoning can be applied:

At least in the case of the Berlin Wall, the delta t argument seems to have worked! (We’ll have to wait awhile before the results come in on Stonehenge, though.) A popular exposition that Gott wrote for New Scientist article also features an inset inviting the reader to use the arrival date of that issue of the magazine to predict how long their current romantic relationship will last. Presumably you can use this book for the same purpose. How long has your present relationship lasted? Use that value for t_past and you get your prediction from the expressions above, complete with an exact confidence interval.

Wacky? Yes, but all this does indeed follow from the assumption that t_now is randomly (and uniformly) sampled from the interval t_begin to t_end. Gott admits that this imposes some restrictions on the applicability of the delta t argument:

[At] a friend’s wedding, you couldn’t use the formula to forecast the marriage’s future. You are at the wedding precisely to witness its beginning. Neither can you use it to predict the future of the Universe itself – for intelligent observers emerged only long after the Big Bang, and so witness only a subset of its timeline. ((Gott 1997), p. 39)

Unfortunately, Gott does not discuss in any more detail the all-important question of when, in practice, the delta t argument is applicable. Yet it is clear from his examples that he thinks it should be applied in a very broad range of real-world situations.

In order to apply the delta t argument to estimate the life-expectancy of the human species, we must measure time on a “population clock” where one unit of time corresponds to the birth of one human. This modification is necessary because the human population is not constant. Thanks to population growth, most humans that have been born so far find themselves later rather than earlier in the history of our species. According to SSA, we should consequently assign a higher prior probability to finding ourselves at these later times. By measuring time as the number of humans that have come into existence, we obtain a scale where you can assign a uniform sampling density to all points of time.

The units are human births. In order to convert this into years, we would have to estimate what the future population figures will be at different times given that a total of N humans will have existed. In the absence of such an estimate, DA leaves room for alternative interpretations. If the world population levels out at 12 billion and human life-expectancy stabilizes at approximately 80 years then disaster is likely to put an end to our species fairly soon (within 1200 years with 75% probability). If population figures rise higher, the prognosis is even worse. But if population decreases drastically or individual human life-spans get much longer, then the delta t argument would be compatible with survival for millions of years.