Lazy Einstein
Alg Ninja
Similarly, to how phasing reduces ZBLL to ZZLL in ZZ-b, ZiF(ZZ-F):
- reduces ZBLL to my LL subset of ZBLL called LEZB [Lazy Einstein's ZBLL (and can be said as LEZBaLLs. ...hmm. Maybe Lezbos? ...I'll work on this later.]; and,
- does so using my LS subset BHLS [(Brant Holbein Last Slot) Take that, James! Muhahaha. (BLS is used already =/.)]
Analytics to follow variant's summarization.
BHLS (Brant Holbein's Last Slot)
- For beginner BHLS (FR slot only. looking at all 4 LS later), a ZZF2L setup algs used to place the last pair to UL/UBL, then inserted uses R U2 R' and U' R U' R'.
- Incredibly, I have found the algs in BHLS are almost completely the intuitive ways to set up the pair UL/UBL(a few exceptions).
- The final thing that makes BHLS its own LS subset is the control of the LL that using UFR/UBR CO recognition to insert the last pair, via R U2 R' and U' R U' R', gives.
- Due to unavoidable phasing in ZZF2L set up algs, adj CO ZBLLs (U/T) are both reduced below 72 cases.
LEZB (Lazy Einstein's Last Layer)
- After LS, we have only 72 L ZBLLs to and only 42 for U/T ZBLLs.
72 + 42 + 42 = 156 ZBLLs for LEZB (More math, reasons, etc below summary)
All LEZB ZBLLs include AUF
The fact that the cons are virtually removed due to the intuitive nature of BHLS. Makes Zif extremely likely to be better than CFOP, ZZ-a, and Roux for TH/OH.
And, if a version of ZBLS can be made with BHLS, this could contend for the best method for big cubes as well.
Let me know what you think.
- reduces ZBLL to my LL subset of ZBLL called LEZB [Lazy Einstein's ZBLL (and can be said as LEZBaLLs. ...hmm. Maybe Lezbos? ...I'll work on this later.]; and,
- does so using my LS subset BHLS [(Brant Holbein Last Slot) Take that, James! Muhahaha. (BLS is used already =/.)]
Analytics to follow variant's summarization.
BHLS (Brant Holbein's Last Slot)
- For beginner BHLS (FR slot only. looking at all 4 LS later), a ZZF2L setup algs used to place the last pair to UL/UBL, then inserted uses R U2 R' and U' R U' R'.
- Incredibly, I have found the algs in BHLS are almost completely the intuitive ways to set up the pair UL/UBL(a few exceptions).
- The final thing that makes BHLS its own LS subset is the control of the LL that using UFR/UBR CO recognition to insert the last pair, via R U2 R' and U' R U' R', gives.
- Due to unavoidable phasing in ZZF2L set up algs, adj CO ZBLLs (U/T) are both reduced below 72 cases.
LEZB (Lazy Einstein's Last Layer)
- After LS, we have only 72 L ZBLLs to and only 42 for U/T ZBLLs.
72 + 42 + 42 = 156 ZBLLs for LEZB (More math, reasons, etc below summary)
All LEZB ZBLLs include AUF
The fact that the cons are virtually removed due to the intuitive nature of BHLS. Makes Zif extremely likely to be better than CFOP, ZZ-a, and Roux for TH/OH.
And, if a version of ZBLS can be made with BHLS, this could contend for the best method for big cubes as well.
Let me know what you think.
APRIL FOOLS!
APRIL FOOLS!
APRIL FOOLS!
APRIL FOOLS!