Even if the community of inquiry is both too clueless to make any contact with reality and too honest to nudge borderline findings into significance, so long as they can keep coming up with new phenomena to look for, the mechanism of the file-drawer problem alone will guarantee a steady stream of new results. There is, so far as I know, no Journal of Evidence-Based Haruspicy filled, issue after issue, with methodologically-faultless papers reporting the ability of sheeps' livers to predict the winners of sumo championships, the outcome of speed dates, or real estate trends in selected suburbs of Chicago. But the difficulty can only be that the evidence-based haruspices aren't trying hard enough, and some friendly rivalry with the plastromancers is called for. It's true that none of these findings will last forever, but this constant overturning of old ideas by new discoveries is just part of what makes this such a dynamic time in the field of haruspicy. Many scholars will even tell you that their favorite part of being a haruspex is the frequency with which a new sacrifice over-turns everything they thought they knew about reading the future from a sheep's liver! We are very excited about the renewed interest on the part of policy-makers in the recommendations of the mantic arts...
Marginal Revolution linked a post at Genomes Unzipped, "Size matters, and other lessons from medical genetics", with the interesting centerpiece graph:
This is from pg 3 of an Ioannidis 2001 et al article (who else?) on what is called a funnel plot: each line represents a series of studies about some particularly hot gene-disease correlations, plotted where Y = the odds ratio (measure of effect size; all results are 'statistically significant', of course) and X = the sample size. The 1 line is the null hypothesis, here. You will notice something dramatic: as we move along the X-axis and sample sizes increase, everything begins to converge on 1:
(See also "Why epidemiology will not correct itself" or the DNB FAQ.)
This graph is interesting as it shows 8 different regressions to the mean. What is also interesting is what a funnel plot is usually used for, why I ran into it in the first place reading Cochrane Group materials - it's used to show publication bias.
That is, suppose you were looking at a gene you know for certain not to be correlated (you knew the null result to be true), and you ran many trials, each with a different number of samples; you would expect that the trials with small samples would have a wide scattering of results (sometimes the effect size would look wildly large and sometimes they would look wildly small or negative), and that this scattering would be equally for and against any connection (on either side of the 1 line). By the same reasoning you would expect that your largest samples would only be scattered a little bit on either side of the 1 line, and the larger the sample the closer they will be to the 1/null line.
If you plotted your hypothetical trials on the above graph, you'd see what looks pretty much like the above graph - a kind of triangular cloud, wide on the left and ever narrowing towards the right as sample sizes increase and variance decreases.
Now here's the question: given that all 8 correlations trend steadily towards the null hypothesis, one would seem to expect them to actually be the null result. But if that is so, where are the random trials scattered on the other side of the 1 line? Not one sequence of studies ever crosses the 1 line!
Wikipedia's funnel chart graph shows us how a plot should look (with this time sample size being the Y axis and odds being the X axis, so the triangle is rotated):
Does that describe any of the sequences graphed above?