Twisted sheaves and $$\mathrm {SU}(r) / {\mathbb {Z}}_{r}$$ Vafa–Witten theory

Jiang, Yunfeng; Kool, Martijn

doi:10.1007/s00208-021-02303-6

Cited by 5 publications

(2 citation statements)

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“…Thus, with the tools of modular forms at our disposal, we are in a position to obtain precise information on the Vafa–Witten invariants in question. One of the most natural families of surfaces, which we consider throughout, are the surfaces, and there have been several recent results for the generating function of Vafa–Witten invariants in this case [15, 22, 23].…”

Section: Introduction and Statement Of Resultsmentioning

confidence: 99%

“…In [15], Jiang and Kool determined the generating function for SU(p)/Z p Vafa-Witten invariants for prime p. To describe the result, fix a Chern class c 1 ∈ H 2 (S, Z), let µ p be the cyclic group of order p and let [15]). For a K3 surface S, prime p, generic polarization and c 1 ∈ H 2 (S, Z) algebraic, we have the partition function…”

Section: Formulae For Vafa-witten Invariantsmentioning

confidence: 99%

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Exact formulae and Turán inequalities for Vafa–Witten invariants of surfaces

R.¹,

Males²

2023

Proceedings of the Edinburgh Mathematical Society

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We consider three different families of Vafa–Witten invariants of $K3$ surfaces. In each case, the partition function that encodes the Vafa–Witten invariants is given by combinations of twisted Dedekind η-functions. By utilizing known properties of these η-functions, we obtain exact formulae for each of the invariants and prove that they asymptotically satisfy all higher-order Turán inequalities.

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