I'm wondering if theres an algorithm set which, when solving the last F2L pair, solves the last layer edges in a way which both orients and permutes (the last layer edges). It's fine if this set has weird requirements, I'm just experimenting. I don't know if this would be like a subset within VLS or not, and I'm not sure where to look for such an oddly specific request.

The reason for this is because I've learned OLL, and I'm pretty happy with my speed at the moment, so I'm messing around with other ways of solving the last layer, right now I'm looking to learn the ZBLL cases where all edges are permuted. I've done a little maths (which could be wrong so feel free to correct me), but since there's only 4 PLL cases where the edges are permuted, and 7 where the edges are all oriented, there should just be 21 of the specific ZBLL cases I'm looking for.

Edit: I realised that since the case could be from any angle, there should actually be 82 cases, owch.

Edit: ok I realise that since E-Perm and H-Perm can only be oriented 2 ways each, it reduces the number of cases to 72 (as its 4 cases for Aa, 4 for Ab, 2 for E, 2 for H, and 7 sets corner orientations for each case its 7x4 7x4 7x2 7x2 which is 68)