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Refined stable pair invariants for E-, M- and [p,q]-strings

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

We use mirror symmetry, the refined holomorphic anomaly equation and modularity properties of elliptic singularities to calculate the refined BPS invariants of stable pairs on non-compact Calabi-Yau manifolds, based on del Pezzo surfaces and elliptic surfaces, in particular the half K3. The BPS numbers contribute naturally to the five-dimensional N=1 supersymmetric index of M-theory, but they can be also interpreted in terms of the superconformal index in six dimensions and upon dimensional reduction the generating functions count N=2 Seiberg-Witten gauge theory instantons in four dimensions. Using the M/F-theory uplift the additional information encoded in the spin content can be used in an essential way to obtain information about BPS states in physical systems associated to small instantons, tensionless strings, gauge symmetry enhancement in F-theory by [p,q]-strings as well as M-strings.

fields

hep-th 2

years

2026 1 2024 1

verdicts

UNVERDICTED 2

representative citing papers

Modular resurgence of topological string

hep-th · 2026-07-01 · unverdicted · novelty 5.0

Stokes constants of topological string non-perturbative contributions are invariant on monodromy orbits, reproduce the BPS spectrum, and satisfy the Kontsevich-Soibelman Lie algebra.

citing papers explorer

Showing 2 of 2 citing papers.

  • BPS Dendroscopy on Local $\mathbb{P}^1\times \mathbb{P}^1$ hep-th · 2024-12-10 · unverdicted · none · ref 38 · internal anchor

    Construction of the scattering diagram for BPS indices on local P1 x P1 and sketch of the Split Attractor Flow Tree Conjecture for restricted central charge phase.

  • Modular resurgence of topological string hep-th · 2026-07-01 · unverdicted · none · ref 45 · internal anchor

    Stokes constants of topological string non-perturbative contributions are invariant on monodromy orbits, reproduce the BPS spectrum, and satisfy the Kontsevich-Soibelman Lie algebra.