English

Lagrangian Intersections, Symplectic Reduction and Kirwan Surjectivity

Algebraic Geometry 2026-02-13 v1 Symplectic Geometry

Abstract

Given a smooth holomorphic symplectic variety XX with a Hamiltonian GG-action, GG-invariant Lagrangians CsC's induce Lagrangians in the symplectic quotient X//GX// G. Given clean intersections B=C1C2B=C_1\cap C_2 whose conormal sequence splits, we show that C1/G×X//GC2/GT[1](B/G).C_1/G\times_{X// G} C_2/G\cong T^{\vee}[-1](B/G). When det(NB/C2)det(N_{B/C_2}) is torsion, we have ExtX//G(OC1/G,OC2/G)HG(B,det(NB/C2)δ)Ext^{\bullet}_{X// G}(\mathcal{O}_{C_1/G}, \mathcal{O}_{C_2/G})\cong H^{\bullet}_G(B, det(N_{B/C_2})_{\delta}) provided that the Hodge-to-de Rham degeneracy holds. Furthermore, we have a generalized version of Kirwan surjectivity ExtX//G(OC1/G,OC2/G)ExtXss//G(OC1ss/G,OC2ss/G)Ext^{\bullet}_{X// G}(\mathcal{O}_{C_1/G}, \mathcal{O}_{C_2/G})\twoheadrightarrow Ext^{\bullet}_{X^{ss}// G}(\mathcal{O}_{C_1^{ss}/G}, \mathcal{O}_{C_2^{ss}/G}) if BB is proper. When C1=C2C_1=C_2, this is the Kirwan surjectivity, which is now interpreted as the symmetry commutes with reduction problem in 3d B-model. We also obtain similar results for KC1/G1/2K_{C_1/G}^{1/2} and KC2/G1/2K_{C_2/G}^{1/2}.

Keywords

Cite

@article{arxiv.2602.11718,
  title  = {Lagrangian Intersections, Symplectic Reduction and Kirwan Surjectivity},
  author = {Naichung Conan Leung and Ying Xie and Yu Tung Yau},
  journal= {arXiv preprint arXiv:2602.11718},
  year   = {2026}
}

Comments

27 pages

R2 v1 2026-07-01T10:33:16.715Z