5d partition functions with a twist

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Abstract We derive the partition function of 5d N = 1 $$ \mathcal{N}=1 $$ gauge theories on the manifold S b 3 × Σ g $$ {S}_b^3 \times {\varSigma}_{\mathfrak{g}} $$ with a partial topological twist along the Riemann surface, Σ g $$ {\varSigma}_{\mathfrak{g}} $$ . This setup is a higher dimensional uplift of the two-dimensional A-twist, and the result can be expressed as a sum over solutions of Bethe-Ansatz-type equations, with the computation receiving nontrivial non-perturbative contributions. We study this partition function in the large N limit, where it is related to holographic RG flows between asymptotically locally AdS6 and AdS4 spacetimes, reproducing known holographic relations between the corresponding free energies on S 5 and S 3 and predicting new ones. We also consider cases where the 5d theory admits a UV completion as a 6d SCFT, such as the maximally supersymmetric N = 2 $$ \mathcal{N}=2 $$ Yang-Mills theory, in which case the partition function computes the 4d index of general class S theories, which we verify in certain simplifying limits. Finally, we comment on the generalization to ℳ 3 × Σ g $$ {\mathrm{\mathcal{M}}}_3 \times {\varSigma}_{\mathfrak{g}} $$ with more general three-manifolds ℳ3 and focus in particular on ℳ 3 = Σ g ′ × S 1 $$ {\mathrm{\mathcal{M}}}_3 = {\varSigma}_{\mathfrak{g}}^{\prime}\times {S}^1 $$ , in which case the partition function relates to the entropy of black holes in AdS6.

Keywords

• AdS-CFT Correspondence
• Supersymmetric Gauge Theory