English

Generalised 4d Partition Functions and Modular Differential Equations

High Energy Physics - Theory 2026-04-14 v3 Mathematical Physics math.MP

Abstract

We prove the equivalence of a class of generalised Schur partition functions ZG(q;α)\mathcal Z_G(q;\alpha) of 4d N=2\mathcal N=2 superconformal gauge theories to contour integral representations of vector-valued modular forms of the type that arise in 2d rational conformal field theories (RCFT). Concretely, we consider the USp(2N)USp(2N) theory with 2N+22N+2 fundamental hypermultiplets and analytically prove that ZUSp(2N)(q;α)\mathcal Z_{USp(2N)}(q;\alpha) satisfies an order-(N+1)(N+1) modular linear differential equation (MLDE) with vanishing Wronskian index, explaining how the parameter α\alpha of the former determines the parameters of the latter. Several connections are made to characters of RCFTs including unitary ones. We then propose a two-parameter extension ZUSp(2N)(q;α,β)\mathcal Z_{USp(2N)}(q;\alpha,\beta) of the generalised Schur partition function. Finally, we relate the α=k\alpha=-k specialisation to quantum monodromy traces TrMk{\rm Tr}\,M^k and formulate a conjecture linking their kk-dependence to MLDEs.

Keywords

Cite

@article{arxiv.2512.02107,
  title  = {Generalised 4d Partition Functions and Modular Differential Equations},
  author = {A. Ramesh Chandra and Sunil Mukhi and Palash Singh},
  journal= {arXiv preprint arXiv:2512.02107},
  year   = {2026}
}

Comments

47 pages, 1 table; v2: references added and minor improvements, v3: minor clarifications and improvements

R2 v1 2026-07-01T08:04:29.897Z