Supersymmetric spectrum for vector multiplet on Euclidean AdS$_2$

TL;DR

This paper analyzes the supersymmetric spectrum of vector multiplets on Euclidean AdS$_2$, revealing spectral shifts for gauginos, boundary mode mappings, and the importance of cohomological field reorganization for supersymmetry correspondence.

Contribution

It extends the spectral analysis from chiral to vector multiplets on Euclidean AdS$_2$, identifying spectral shifts, boundary mode relations, and the role of cohomological field reorganization.

Findings

Gaugino spectrum requires ±i/2 shifts from real spectrum.

Boundary zero modes are mapped to spectral points at zero.

Not all bosonic fields satisfy normalizable boundary conditions.

Abstract

Quantum study of supersymmetric theories on Euclidean two dimensional anti-de Sitter space (EAdS$_2$) requires complexified spectrum. For a chiral multiplet, we showed that the spectrum of the Dirac operator acquires a universal shift of $\text{i}/2$ from the real spectrum to make the supersymmetry between boson and fermion manifest, where both the bosonic and fermionic eigenfunctions are normalizable using an appropriate definition of Euclidean inner product. We extend this analysis to the vector multiplet, where we show that the gaugino requires both $+\text{i}/2$ and $-\text{i}/2$ shift from the real spectrum, and there is additional isolated point at vanishing spectral parameter which is mapped by supersymmetry to the boundary zero modes of the vector field. Furthermore, this spectral analysis shows that not every bosonic fields in the vector multiplet can satisfy normalizable boundary condition. Nevertheless, aided by a reorganization of fields into a cohomological form, we find the supersymmetry mapping between bosons and fermions in terms of the expansion coefficients with respect to the newly constructed basis.