2014
DOI: 10.1007/jhep03(2014)040
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The $ \mathcal{N} $ = 1 Chiral Multiplet on T 2 × S 2 and Supersymmetric Localization

Abstract: We compute the supersymmetric partition function of an N = 1 chiral multiplet coupled to an external Abelian gauge field on complex manifolds with T 2 ×S 2 topology. The result is locally holomorphic in the complex structure moduli of T 2 × S 2 . This computation illustrates in a simple example some recently obtained constraints on the parameter dependence of supersymmetric partition functions.We also devise a simple method to compute the chiral multiplet partition function on any four-manifold M 4 preserving … Show more

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Cited by 98 publications
(199 citation statements)
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References 55 publications
(197 reference statements)
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“…As the transformation is not continuously connected to the identity, it is a large diffeomorphism of the manifold. The failure of the superconformal index/partition function to be invariant under this diffeomorphism points towards the presence of a gravitational anomaly (see [7] for a similar phenomenon).…”
Section: Discussionmentioning
confidence: 95%
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“…As the transformation is not continuously connected to the identity, it is a large diffeomorphism of the manifold. The failure of the superconformal index/partition function to be invariant under this diffeomorphism points towards the presence of a gravitational anomaly (see [7] for a similar phenomenon).…”
Section: Discussionmentioning
confidence: 95%
“…(1.1) emerges from SL(3, Z) transformations and, given that the localization result holds, found a way to write the partition function in terms of a modified elliptic hypergeometric integral. It is tempting to state that the modified elliptic hypergeometric integrals actually coincide with partition functions, as the exponent in the computations of the latter for example in the case of a chiral superfield in [7] is similar to the SL(3, Z) transformation factor. However, due to the complicated nature of the regularization procedure such a statement would require rigorous mathematical justification (see [5][6][7][8] for detailed considerations of this problem).…”
Section: Discussionmentioning
confidence: 99%
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“…(A more detailed discussion will appear in [68].) We will realize them as quotients of C × CP 1 with metric…”
Section: Jhep01(2014)124mentioning
confidence: 99%
“…The Coulomb branch partition functions on these spaces have been computed in [16,37,38] and [39][40][41].…”
Section: Jhep11(2015)155mentioning
confidence: 99%