English

5d Partition Functions with A Twist

High Energy Physics - Theory 2018-12-05 v2

Abstract

We derive the partition function of 5d N=1{\cal N}=1 gauge theories on the manifold Sb3×ΣgS^3_b \times \Sigma_{\frak g} with a partial topological twist along the Riemann surface, Σg\Sigma_{\frak 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 NN limit, where it is related to holographic RG flows between asymptotically locally AdS6_6 and AdS4_4 spacetimes, reproducing known holographic relations between the corresponding free energies on S5S^{5} and S3S^{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{\cal N}=2 Yang-Mills theory, in which case the partition function computes the 4d index of general class S{\cal S} theories, which we verify in certain simplifying limits. Finally, we comment on the generalization to M3×Σg{\cal M}_3 \times \Sigma_{\frak g} with more general three-manifolds M3{\cal M}_3 and focus in particular on M3=Σg×S1{\cal M}_3=\Sigma_{\frak g'}\times S^{1}, in which case the partition function relates to the entropy of black holes in AdS6_6.

Keywords

Cite

@article{arxiv.1808.06744,
  title  = {5d Partition Functions with A Twist},
  author = {P. Marcos Crichigno and Dharmesh Jain and Brian Willett},
  journal= {arXiv preprint arXiv:1808.06744},
  year   = {2018}
}

Comments

Corrected typos, updated references, and added clarifying comments in Section 5

R2 v1 2026-06-23T03:39:05.917Z