The math of it isn’t as neat as I’d like, but what I mean is that there are only finitely many hypotheses of each complexity, exponentially many as the complexity goes up, and that most of them differ from each other at some point, so ordinary summability criteria “almost” apply. I don’t think that the number of epiphenomenal hypotheses could be enough to keep the average up.
The math of it isn’t as neat as I’d like, but what I mean is that there are only finitely many hypotheses of each complexity, exponentially many as the complexity goes up, and that most of them differ from each other at some point, so ordinary summability criteria “almost” apply. I don’t think that the number of epiphenomenal hypotheses could be enough to keep the average up.
A hypothesis has approximately the same complexity as its negation, so we have many pairs that sum to 1 each.