Looking at the mixed landscape from the previous post
bottom image is the generating spheres with an arrow showing the substitution.
We can get rid of that solidity by making the child limit set substitute back to the parent. In this case the same sphere is substituting back:
I prefer this way of viewing the substitutions, even if it could sometimes be ambiguous:
You can substitute a different sphere back to get a less geometric result:
this is continuoue and invariant to order of sphere processing. If we make sphere 0's sphere 0 substitute to child sphere 0 and sphere 1's sphere 1 substitute to child sphere 1 then we get smaller surface patches. They are round in some places, but at the overlap (top left) they combine correctly into longer shapes, which wouldn't otherwise happen. We usually have problems when substituting neighbouring spheres:
The third problem is that we can't do substitutions on neighbouring spheres. But we can use the same solution above, just give the child sets different values of the shell-shell to tree-tree parameter.
but I'm not sure if the surface is continuous in this case. You have to be careful with overlapping spheres when making substitutions.
If the tree area is now too sparse you can substitute back to the golden sphere limit set only on a grandchild instead:
The second problem is that the patches are perfectly round. In fact deeper zooms would be less round patches as that is partially due to the outer set being perfectly icosahedral. But they'd still be fairly round.
barely noticeable from this distance but there are little patches of 'smooth earth' inside the green areas here.
One way to fix this is to substitute multiple overlapping spheres across to the child set rather than lone spheres. The first step would be two overlapping spheres.
The only way I know how to do this currently is for those two spheres and neighbours to be the same (up to a Mobius transformation) in the child limit set. That reduces the free spheres to adjust to four. But due to the lack of symmetry it only allows one parameter to change. So back to tree-tree / shell-shell structures.
If we make a brown such tree-tree on sphere 0:
then we can also add one to sphere 1, since we made the child set match 0,1 and their neighbours:
The third problem is that we can't do substitutions on neighbouring spheres. But we can use the same solution above, just give the child sets different values of the shell-shell to tree-tree parameter.
Here sphere 0 links to the brown tree-tree set and sphere 1 links to the grey shell-shell:
These are two variants, the left uses the green shape for the four free balls and the right uses the brown hilly shape. In both cases the overlap region exactly connects the brown and green sets together.
Notice that the overlap between top and left patches prioritises sphere 0 (top). That means sphere processing order does effect the shape. The only fix to this would be to create some sort of tree/shell mixture in the overlap and I currently don't know how to do this.
Nevertheless, the landscape still works in the sense of being continuous. And just as discussed at the top, the patches neededn't be solid, we can for instance substitute sphere 0 of the shell child back to the tree child and sphere 1 of the tree child back to the shell child:
This produces a lot of variety, with three sets being blended (pale grey sphereical, grey craters and brown hills) and the two child sets overlapping. Nevertheless we are only working with a one-parameter knob, from crater to hills. 
We can do better than this by making a special set for the overlap region between child sets A and B. We allow A and B their full usual freedom where only the replacement ball and its neighbours are constrained to the parent balls. For this icosahedral configuration that means 6 balls of freedom.
The overlap set is constrained so that A's constrained ball indices are constrained between the overlap set and B, while B's constrained ball indices are constrained between the overlap and A. That leaves 4 balls of freedom on the overlap set.
Below uses the ridgey set in green for ball 0 and a hilly set in brown for ball 1:
Note the discontinuity (gap) between green and brown. Now we add in the interpolating overlap set:
You can also see in the bottom right that this overlap automatically applies to the smaller patches too.
Bottom left you see a green patch that doesn't have an overlap region with the large brown region on the left. This is a discontinuity, so we need to apply the intermediate patch to this too.
To do this requires a careful procedure inside the iteration loop:
1. whenever inside a sphere with a substitution set, record this substitution set as destination_set.
2. if the query point leaves either this sphere or its neighbours then switch to destination_set.
3. if the query point ends up in any overlapping sphere with a substitution set, then switch to that overlap set
The result applies the transitional set on the smaller green patches too:
and you can also see that the orange patches transition onto the bigger green patch.
In terms of 2D classification, the non-overlapping substitution sets were a cluster-solid of patches, whereas the overlapping substitution sets form a tree-solid of patches. The outline of green-and-brown is a fractal tree, which is quite nice as it is a more natural transition than a smooth disk. It for instance matches the sort of shape of mountains over flatlands or snowcaps over a mountain range.
It doesn't just work on a sphere, here's a cratered globe (by pulling in the lowest sphere):
The brown hilly set and the green ridgey set are:
The above craters don't overlap the two child sets, so let's get a bit more adventurous and dent sphere 2, which is a neighbour of both child sets (at sphere's 0 and 1):
and a close up:
