So I came up with a new class of polytopes called semiscaliforms, based on semiuniform polytopes.
So I have created a rule list for semiuniform polytopes which can easily be adapted for a scaliform equivalent.
1. vertex transitive
2. elements are semiuniform
3. faces are vertex-transitive
Now, if you simply remove 2, we have semiscaliforms, polytopes which have vertex-transitive faces and are vertex-transitive, but don't have to have vertex-transitive elements. This allows for a continuum of polytopes, with the amount of semiscaliforms reaching to uncountably infinite.
I'm quite interested of what petsu of semiscaliforms would be like.