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Superconformal mechanics in SU(2|1) superspace

arXiv:1501.05622 · doi:10.1103/PhysRevD.91.085032

Abstract

Using the worldline SU(2|1) superfield approach, we construct N=4 superconformally invariant actions for the d=1 multiplets (1, 4, 3) and (2, 4, 2). The SU(2|1) superfield framework automatically implies the trigonometric realization of the superconformal symmetry and the harmonic oscillator term in the corresponding component actions. We deal with the general N=4 superconformal algebra D(2,1;$α$) and its central-extended $α$=0 and $α$=-1 psu(1,1|2)$\oplus$su(2) descendants. We capitalize on the observation that D(2,1;$α$) at $α\neq$0 can be treated as a closure of its two su(2|1) subalgebras, one of which defines the superisometry of the SU(2|1) superspace, while the other is related to the first one through the reflection of $μ$, the parameter of contraction to the flat N=4, d=1 superspace. This closure property and its $α$=0 analog suggest a simple criterion for the SU(2|1) invariant actions to be superconformal: they should be even functions of $μ$. We find that the superconformal actions of the multiplet (2, 4, 2) exist only at $α$=-1, 0 and are reduced to a sum of the free sigma-model type action and the conformal superpotential yielding, respectively, the oscillator potential $\sim μ^2$ and the standard conformal inverse-square potential in the bosonic sector. The sigma-model action in this case can be constructed only on account of non-zero central charge in the superalgebra su(1,1|2).

1 + 49 pages, minor corrections in eqs. (4.9), (4.25), (4.35) and (4.36), new insertion after eq. (4.52)