Metastable supersymmetry breaking in N=2 non-linear sigma-models

TL;DR

This paper investigates the metastability of supersymmetry-breaking vacua in N=1 and N=2 theories, revealing conditions for stability and deriving new results for complex models with hyper and vector multiplets.

Contribution

It provides a systematic comparison of metastability conditions in N=1 and N=2 non-linear sigma-models, including new results for general cases with hyper and vector multiplets.

Findings

Reproduced and clarified no-go theorems for Abelian vector and hyper multiplet models.

Derived new metastability conditions for more general N=2 models.

Presented a coordinate-covariant construction of N=2 theories in N=1 superspace.

Abstract

We perform a general study of the issue of metastability for supersymmetry-breaking vacua in theories with N=1 and N=2 global supersymmetry. This problem turns out to capture all the important qualitative features of the corresponding question in theories with local supersymmetry, where gravitational effects induce only quantitative modifications. Moreover, it allows to directly compare the conditions arising in the N=1 and N=2 cases, since the latter becomes particular case of the former in the rigid limit. Our strategy consists in a systematic investigation of the danger of instability coming from the sGoldstini scalars, whose masses are entirely due to supersymmetry breaking mass-splitting effects. We start by reviewing the metastability conditions arising in general N=1 non-linear sigma-models with chiral and vector multiplets. We then turn to the case of general N=2 non-linear sigma-models with hyper and vector multiplets. We first reproduce and clarify the known no-go theorems applying to theories with only Abelian vector multiplets and only hyper multiplets, and then derive new results applying to more general cases. To make the comparison with N=1 models as clear as possible, we rely on a formulation of N=2 models where one of the supersymmetries is manifestly realized in terms of ordinary superfields, whereas the other is realized through non-trivial transformations. We give a self-contained account of such a construction of N=2 theories in N=1 superspace, generalizing previous work on various aspects to reach a general and coordinate-covariant construction. We also present a direct computation of the supertrace of the mass matrix.