Modular structures in the DSSYK partition function

Abstract

We study the low-temperature expansion of the disk partition function Z(β) of the double-scaled SYK model (DSSYK) at fixed coupling λ=2p2/N, where N is the number of Majorana fermions and p is the number of fermions in each interaction term, both taken to infinity. We show that the exact Bessel-function representation of Z(β), expanded at large argument (corresponding to low temperature), can be organized in terms of the classical ring of quasi-modular Eisenstein series E2,E4,E6 and their differential identities. Exploiting the modular S-duality properties of this ring, we derive the semiclassical (small λ) low-temperature expansion of Z(β), splitting it into a perturbative tower and a non-perturbative sector controlled by q=e-4π2/λ. At each order in q, we determine the non-perturbative correction in closed form up to second order in λ; the resulting series resums into a compact expression in the same Eisenstein series, extending previous semiclassical results beyond their strict β∞ limit. We further show that this entire structure follows from a single, exact differential equation coupling a modular derivative to derivatives with respect to temperature. Finally, we prove that the non-perturbative sector of Z(β) is exactly supported, to all orders in λ, on the same exponents as the on-shell actions of known bilocal-Liouville saddles of the DSSYK Schwarzian limit, pointing to a well-defined bulk origin for these non-perturbative corrections.

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