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2021), arXiv: 2111.04694v1

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

6 Pith papers citing it

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Generalized Bogomolov Inequalities

math.AG · 2025-10-06 · unverdicted · novelty 7.0

Defines generalized Hodge-Riemann and Bogomolov pairs of cohomology classes, conjectures the former imply the latter, proves cases, and obtains new boundedness theorems for semistable sheaves.

The multiple cover formula for $K3$ and abelian surfaces

math.AG · 2026-05-28 · unverdicted · novelty 6.0

Multiple cover formulas for reduced descendent GW invariants on K3 and abelian surfaces are implied by the conjectural families GW/PT correspondence, with the PT side proven via cosections and universality.

Modules and generalizations of Joyce vertex algebras

math.AG · 2025-05-30 · unverdicted · novelty 6.0

Generalizes Joyce vertex algebras to non-linear enumerative problems and constructs twisted modules in the orthosymplectic case, proposing variants for different enumerative invariants.

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Showing 4 of 4 citing papers after filters.

  • Rationality and symmetry of stable pairs generating series of Fano 3-folds math.AG · 2026-04-07 · unverdicted · none · ref 18

    Generating series of stable pairs descendent invariants on Fano 3-folds are rational and q ↔ q^{-1} symmetric.

  • Generalized Bogomolov Inequalities math.AG · 2025-10-06 · unverdicted · none · ref 6

    Defines generalized Hodge-Riemann and Bogomolov pairs of cohomology classes, conjectures the former imply the latter, proves cases, and obtains new boundedness theorems for semistable sheaves.

  • The multiple cover formula for $K3$ and abelian surfaces math.AG · 2026-05-28 · unverdicted · none · ref 28

    Multiple cover formulas for reduced descendent GW invariants on K3 and abelian surfaces are implied by the conjectural families GW/PT correspondence, with the PT side proven via cosections and universality.

  • Modules and generalizations of Joyce vertex algebras math.AG · 2025-05-30 · unverdicted · none · ref 24

    Generalizes Joyce vertex algebras to non-linear enumerative problems and constructs twisted modules in the orthosymplectic case, proposing variants for different enumerative invariants.