This with breaking LK symmetrically in mb and mf and also in T
1. S=0
2. S=2
This is with LK's m eqn break symmetrically and mb in T eqn.
3. S=0
4. S=2
This is with grad^2(mb) term in mb eqn, no div(mf*T) term in mf eqn, mb in T eqn.
5. S=0
6. S=2
This is with div(mf*T) term in mf eqn, no grad^2(mb) term in mb eqn, mb in T eqn.
7. S=0
8. S=2
.....................................
These are with transformed coordinates, M=mb+mf,D=mb-mf
1. S=0
2. S=2