Sorry for the late reply. So off-shell for N=1 requires 2 bosonic d.o.f. for the chiral superultiplet, and 1 for the vector. For N=2 the vector supermultiplet requires 3 bosonic d.o.f.. I've been looking at this some more, and I think I'm getting even more confused because when I try and write...
I was wondering since the Vector supermultiplet in N=2 SUSY can be built from a Chiral and a Vector supermultiplet from N=1, in order to make up the off-shell degrees of freedom, would you include the two auxiliary fields from the N=1 theory (traditionally F from the Chiral and D from the vector...
So using the property
U†U=1
I was able to get
∑uikujk*=δij
where the sum is over k=1,...,n and u is a complex number.
from this you get n equations when i=j. If i≠j I get n(n-1) equations but in the notes I'm reading from it...
Hello, first off, I'm not sure if I put this question in the right place so sorry about that.
Given Bi = 1/2 εijk Fjk how would you find F in terms of B? I think you multiply through by another Levi-Civita, but then I don't know what to do after that. Any help would much appreciated.