There are many more chaotic worlds, but simple worlds will be more common within those chaotic worlds. For example, for any universe you can get another universe by adding “You turn into a pheasant”, but you can also get one by adding “Universe A exists inside of it”. Because the latter is presumably simpler, it will occur more often. There will also be universes that have “Universe A + you turn into a pheasant exists inside of it” but there will be more with “Universe A exists inside of it twice” and so on. In short, although virtually every universe is chaotic, most of the people living in them will be the ones living in ordered universes inside of them.
The ordered universes have a higher weight. The weight decreases exponentially with the chaos, so that there’s a finite probability of a finitely chaotic world.
There’s two possible counterarguments to this:
There are many more chaotic worlds, but simple worlds will be more common within those chaotic worlds. For example, for any universe you can get another universe by adding “You turn into a pheasant”, but you can also get one by adding “Universe A exists inside of it”. Because the latter is presumably simpler, it will occur more often. There will also be universes that have “Universe A + you turn into a pheasant exists inside of it” but there will be more with “Universe A exists inside of it twice” and so on. In short, although virtually every universe is chaotic, most of the people living in them will be the ones living in ordered universes inside of them.
The ordered universes have a higher weight. The weight decreases exponentially with the chaos, so that there’s a finite probability of a finitely chaotic world.