Domain wall moduli in softly-broken SQCD at $\barθ=Ï$
arXiv:1804.01978 · doi:10.1103/PhysRevD.97.105015
Abstract
We analyze the moduli space dynamics of domain walls in $SU(N)$ QCD at $\barθ=Ï$, by softly breaking ${\cal N}\! =\!1$ SQCD with sfermion mixing. In the supersymmetric limit, BPS domain walls between neighbouring vacua are known to possess non-translational flavour moduli that form a $\mathcal{C} P^{N-1}$ sigma model. For the simplest case with gauge group $SU(2)$ and $N_f=2$, we show that this sigma model also exhibits a Hopf term descending from the bulk Wess-Zumino term with a quantized coefficient. On soft-breaking of supersymmetry via sfermion mixing that preserves the flavour symmetry, these walls and their moduli-space dynamics survives when $\barθ=Ï$ so that there are two degenerate vacua.
8 pages, 1 figure. V2: References added; Version published in Phys. Rev. D